Solving a system of linear inequalities with one variable. Systems of inequalities - basic information

23.09.2019

A program for solving linear, quadratic and fractional inequalities not only gives the answer to the problem, it gives detailed solution with explanations, i.e. displays the solution process to test knowledge in mathematics and/or algebra.

Moreover, if in the process of solving one of the inequalities it is necessary to solve, for example, quadratic equation, then its detailed solution is also displayed (it contains a spoiler).

This program may be useful for high school students in preparing for tests, to parents to monitor their children’s solutions to inequalities.

This program can be useful for high school students in general education schools when preparing for tests and exams, when testing knowledge before the Unified State Exam, and for parents to control the solution of many problems in mathematics and algebra. Or maybe it’s too expensive for you to hire a tutor or buy new textbooks? Or do you just want to get it done as quickly as possible? homework

in mathematics or algebra? In this case, you can also use our programs with detailed solutions.

In this way, you can conduct your own training and/or training of your younger brothers or sisters, while the level of education in the field of solving problems increases.

Rules for entering inequalities
Any Latin letter can act as a variable.

For example: $x, y, z, a, b, c, o, p, q$, etc.
Numbers can be entered as whole or fractional numbers. Moreover, fractional numbers

can be entered not only as a decimal, but also as an ordinary fraction.
Rules for entering decimal fractions.
In decimal fractions, the fractional part can be separated from the whole part by either a period or a comma. For example, you can enter decimals

like this: 2.5x - 3.5x^2
Rules for entering ordinary fractions.

Only a whole number can act as the numerator, denominator and integer part of a fraction.

The denominator cannot be negative. When entering numerical fraction /
The numerator is separated from the denominator by a division sign: Whole part &
separated from the fraction by an ampersand:
Input: 3&1/3 - 5&6/5y +1/7y^2

Result: $3\frac(1)(3) - 5\frac(6)(5) y + \frac(1)(7)y^2 $
You can use parentheses when entering expressions. In this case, when solving inequalities, the expressions are first simplified. For example:

5(a+1)^2+2&3/5+a > 0.6(a-2)(a+3)

Solve the system of inequalities

It was discovered that some scripts necessary to solve this problem were not loaded, and the program may not work.
You may have AdBlock enabled.
In this case, disable it and refresh the page.

JavaScript is disabled in your browser.
For the solution to appear, you need to enable JavaScript.
Here are instructions on how to enable JavaScript in your browser.

Because There are a lot of people willing to solve the problem, your request has been queued.
In a few seconds the solution will appear below.
Please wait sec...

If you noticed an error in the solution, then you can write about this in the Feedback Form.
Do not forget indicate which task you decide what enter in the fields.

Our games, puzzles, emulators:

A little theory.

Systems of inequalities with one unknown. Numeric intervals

You became familiar with the concept of a system in 7th grade and learned to solve systems of linear equations with two unknowns. Next we will consider systems of linear inequalities with one unknown. Sets of solutions to systems of inequalities can be written using intervals (intervals, half-intervals, segments, rays). You will also become familiar with the notation of number intervals.

If in the inequalities $4x > 2000$ and $5x \leq 4000$ the unknown number x is the same, then these inequalities are considered together and they are said to form a system of inequalities: $$ \left\(\begin( array)(l) 4x > 2000 \\ 5x \leq 4000 \end(array)\right $$.

The curly bracket shows that you need to find values of x for which both inequalities of the system turn into correct numerical inequalities. This system- an example of a system of linear inequalities with one unknown.

The solution to a system of inequalities with one unknown is the value of the unknown at which all the inequalities of the system turn into true numerical inequalities. Solving a system of inequalities means finding all solutions to this system or establishing that there are none.

The inequalities $x \geq -2 $ and $x \leq 3 $ can be written as a double inequality: $-2 \leq x \leq 3 $.

The solutions to systems of inequalities with one unknown are different number sets. These sets have names. Thus, on the number axis, the set of numbers x such that $-2 \leq x \leq 3 $ is represented by a segment with ends at points -2 and 3.

-2

If \(a is a segment and is denoted by [a; b]

If \(a is an interval and is denoted by (a; b)

Sets of numbers $x$ satisfying the inequalities \(a \leq x are half-intervals and are denoted respectively [a; b) and (a; b]

Segments, intervals, half-intervals and rays are called numerical intervals.

Thus, numerical intervals can be specified in the form of inequalities.

The solution to an inequality in two unknowns is a pair of numbers (x; y) that turns the given inequality into a true numerical inequality. Solving an inequality means finding the set of all its solutions. Thus, the solutions to the inequality x > y will be, for example, pairs of numbers (5; 3), (-1; -1), since $5 \geq 3 $ and $-1 \geq -1$

Solving systems of inequalities

You have already learned how to solve linear inequalities with one unknown. Do you know what a system of inequalities and a solution to the system are? Therefore, the process of solving systems of inequalities with one unknown will not cause you any difficulties.

And yet, let us remind you: to solve a system of inequalities, you need to solve each inequality separately, and then find the intersection of these solutions.

For example, the original system of inequalities was reduced to the form:
$$ \left\(\begin(array)(l) x \geq -2 \\ x \leq 3 \end(array)\right. $$

To solve this system of inequalities, mark the solution to each inequality on the number line and find their intersection:

-2

The intersection is the segment [-2; 3] - this is the solution to the original system of inequalities.

Municipal budget educational institution

"Average comprehensive school №26

with in-depth study of individual subjects"

city of Nizhnekamsk of the Republic of Tatarstan

Math lesson notes
in 8th grade

Solving inequalities with one variable

and their systems

prepared

mathematic teacher

first qualification category

Kungurova Gulnaz Rafaelovna

Nizhnekamsk 2014

Plan summary lesson

Teacher: Kungurova G.R.

Subject: mathematics

Topic: “Solving linear inequalities with one variable and their systems.”

Class: 8B

Date: 04/10/2014

Lesson type: lesson of generalization and systematization of the studied material.

The purpose of the lesson: consolidation of practical skills in solving inequalities with one variable and their systems, inequalities containing a variable under the modulus sign.

Lesson objectives:

Educational:

generalization and systematization of students’ knowledge about ways to solve inequalities with one variable;

expansion of the type of inequalities: double inequalities, inequalities containing a variable under the modulus sign, systems of inequalities;

establishing interdisciplinary connections between mathematics, Russian language, and chemistry.

Educational:

activation of attention, mental activity, development of mathematical speech, cognitive interest among students;

mastering the methods and criteria of self-assessment and self-control.

Educational:

fostering independence, accuracy, and the ability to work in a team

Basic methods used in the lesson: communicative, explanatory-illustrative, reproductive, method of programmed control.

Equipment:

computer

computer presentation

monoblocks (performing an individual online test)

handouts (multi-level individual assignments);

self-control sheets;

Lesson plan:

1. Organizing time.

4. Independent work

5. Reflection

6. Lesson summary.

During the classes:

1. Organizational moment.

(The teacher tells the students the goals and objectives of the lesson.).

Today we are faced with a very important task. We must summarize this topic. Once again, it will be necessary to work very carefully on theoretical issues, do calculations, and consider the practical application of this topic in our Everyday life. And we must never forget about how we reason, analyze, build logical chains. Our speech should always be literate and correct.

Each of you has a self-control sheet on your desk. Throughout the lesson, remember to mark your contributions to this lesson with a “+” sign.

The teacher assigns homework, commenting on it:

№1026(a,b), No.1019(c,d); additionally - No. 1046(a)

2. Updating knowledge, skills and abilities

1) Before we start practical tasks, let's turn to theory.

The teacher announces the beginning of the definition, and the students must complete the formulation.

a) An inequality in one variable is an inequality of the form ax>b, ax<в;

b) Solving an inequality means finding all its solutions or proving that there are no solutions;

c) The solution to an inequality with one variable is the value of the variable that turns it into a true inequality;

d) Inequalities are said to be equivalent if their sets of solutions coincide. If they have no solutions, then they are also called equivalent

2) On the board there are inequalities with one variable, arranged in one column. And next to it, in another column, their solutions are written in the form of numerical intervals. The students' task is to establish correspondence between inequalities and corresponding intervals.

Establish a correspondence between inequalities and numerical intervals:

1. 3x > 6 a) (-∞ ; - 0.2]

2. -5x ≥ 1 b) (- ∞ ; 15)

3. 4x > 3 c) (2; + ∞)

4. 0.2x< 3 г) (0,75; + ∞)

3) Practical work in a self-test notebook.

Students write a linear inequality in one variable on the board. Having completed this, one of the students voices his decision and the mistakes made are corrected)

Solve the inequality:

4 (2x - 1) - 3(x + 6) > x;

8x - 4 - 3x - 18 > x;

8x - 3x – x > 4+18 ;

4x > 22 ;

x > 5.5.

Answer. (5.5 ; +∞)

3. Practical use inequalities in everyday life ( chemical experiment)

Inequalities in our daily lives can be good helpers. And besides, of course, there is an inextricable connection between school subjects. Mathematics goes hand in hand not only with the Russian language, but also with chemistry.

(On each desk there is a reference scale for the pH value, ranging from 0 to 12)

If 0 ≤ pH< 7, то среда кислая;

if pH = 7, then the environment is neutral;

if the indicator is 7< pH ≤ 12, то среда щелочная

The teacher pours 3 colorless solutions into different test tubes. From the chemistry course, students are asked to remember the types of solution media (acidic, neutral, alkaline). Next, experimentally, involving students, the environment of each of the three solutions is determined. To do this, a universal indicator is lowered into each solution. What happens is that each indicator is colored accordingly. And by color scheme, thanks to the standard scale, students establish the environment of each of the proposed solutions.

Conclusion:

1 indicator turns red, indicator 0 ≤ pH< 7, значит среда первого раствора кислая, т.е. имеем кислоту в 1пробирке

2 indicator turns green color, pH = 7, which means the medium of the second solution is neutral, i.e. we had water in test tube 2

3 indicator turns Blue colour, indicator 7< pH ≤ 12 , значит среда третьего раствора щелочная, значит в 3 пробирке была щелочь

Knowing the pH limits, you can determine the acidity level of soil, soap, and many cosmetics.

Continued updating of knowledge, skills and abilities.

1) Again, the teacher begins to formulate definitions, and students must complete them

Continue definitions:

a) Solving a system of linear inequalities means finding all its solutions or proving that there are none

b) The solution to a system of inequalities with one variable is the value of the variable for which each of the inequalities is true

c) To solve a system of inequalities with one variable, you need to find a solution to each inequality, and find the intersection of these intervals

The teacher again reminds students that the ability to solve linear inequalities with one variable and their systems is the basis, the basis for more complex inequalities, which will be studied in higher grades. A foundation of knowledge is laid, the strength of which will have to be confirmed at the OGE in mathematics after 9th grade.

Students write in their notebooks to solve systems of linear inequalities with one variable. (2 students complete these tasks on the board, explain their solution, voice the properties of the inequalities used in solving the systems).

№1012(d). Solve system of linear inequalities

0.3 x+1< 0,4х-2;

1.5 x-3 > 1.3 x-1. Answer. (30; +∞).

№1028(d). Solve the double inequality and list all the integers that are its solution

1 < (4-2х)/3 < 2 . Ответ. Целое число: 0

2) Solving inequalities containing a variable under the modulus sign.

Practice shows that inequalities containing a variable under the modulus sign cause anxiety and self-doubt in students. And often students simply do not take on such inequalities. And the reason for this is a poorly laid foundation. The teacher encourages students to work on themselves in a timely manner and to consistently learn all the steps to successfully implement these inequalities.

Oral work is carried out. (Front survey)

Solving inequalities containing a variable under the modulus sign:

1. The modulus of a number x is the distance from the origin to the point with coordinate x.

| 35 | = 35,

| - 17 | = 17,

| 0 | = 0

2. Solve inequalities:

a) | x |< 3 . Ответ. (-3 ; 3)

b) | x | > 2. Answer. (- ∞; -2) U (2; +∞)

The progress of solving these inequalities is displayed in detail on the screen and the algorithm for solving inequalities containing a variable under the modulus sign is spelled out.

4. Independent work

In order to control the degree of mastery of this topic, 4 students take seats at the monoblocks and take thematic online testing. Testing time is 15 minutes. After completion, a self-test is carried out both in points and as a percentage.

The rest of the students at their desks do independent work in variants.

Independent work (completion time 13min)

Option 1

Option 2

1. Solve the inequalities:

a) 6+x< 3 - 2х;

b) 0.8(x-3) - 3.2 ≤ 0.3(2 - x).

3(x+1) - (x-2)< х,

2 > 5x - (2x-1) .

-6 < 5х - 1 < 5

4*. (Additionally)

Solve the inequality:

| 2- 2x | ≤ 1

1. Solve the inequalities:

a) 4+x< 1 - 2х;

b) 0.2(3x - 4) - 1.6 ≥ 0.3(4-3x).

2. Solve the system of inequalities:

2(x+3) - (x - 8)< 4,

6x > 3(x+1) -1.

3. Solve double inequality:

-1 < 3х - 1 < 2

4*. (Additionally)

Solve the inequality:

| 6x-1 | ≤ 1

After completing independent work, students hand over their notebooks for checking. Students who worked on monoblocks also hand over their notebooks to the teacher for checking.

5. Reflection

The teacher reminds students of the self-control sheets, on which they had to evaluate their work with a “+” throughout the lesson, at its various stages.

But students will have to give the main assessment of their activities only now, after voicing one ancient parable.

Parable.

A sage was walking, and 3 people met him. They carried carts with stones under the hot sun for the construction of the temple.

The sage stopped them and asked:

- What did you do all day?

“I carried the damned stones,” answered the first.

“I did my job conscientiously,” answered the second.

“And I took part in the construction of the temple,” the third answered proudly.

In the self-control sheets, in point No. 3, students must enter a phrase that would correspond to their actions in this lesson.

Self-control sheet __________________________________________

№ P / P

Lesson steps

Grade educational activities

Oral work at the lesson

Practical part:

Solving inequalities with one variable;

solving systems of inequalities;

solving double inequalities;

solving inequalities with modulus sign

Reflection

In paragraphs 1 and 2, mark the correct answers in the lesson with a “+” sign;

in paragraph 3, evaluate your work in class according to the instructions

6. Lesson summary.

The teacher, summing up the lesson, notes successful moments and problems on which additional work remains to be done.

Students are asked to evaluate their work according to self-control sheets, and students receive one more mark based on the results of independent work.

At the end of the lesson, the teacher draws the students’ attention to the words of the French scientist Blaise Pascal: “The greatness of a person lies in his ability to think.”

Bibliography:

1 . Algebra. 8th grade. Yu.N.Makarychev, N.G. Mindyuk, K.E. Neshkov, I.E. Feoktistov.-M.:

Mnemosyne, 2012

2. Algebra.8th grade. Didactic materials. Guidelines/ I.E. Feoktistov.

2nd edition., St.-M.: Mnemosyne, 2011

3. Testing and measuring materials. Algebra: 8th grade / Compiled by L.I. Martyshova.-

M.: VAKO, 2010

Internet resources:

Lesson topic: Solving a system of linear inequalities with one variable

Date of: _______________

Class: 6a, 6b, 6c

Lesson type: learning new material and primary consolidation.

Didactic goal: create conditions for awareness and comprehension of a block of new educational information.

Goals: 1) Educational: introduce the concepts: solution of systems of inequalities, equivalent systems of inequalities and their properties; teach how to apply these concepts when solving simple systems of inequalities with one variable.

2) Developmental: promote the development of creative elements, independent activity students; develop speech, the ability to think, analyze, generalize, express your thoughts clearly and concisely.

3) Educational: upbringing respectful attitude to each other and a responsible attitude towards educational work.

Tasks:

repeat the theory on the topic of numerical inequalities and numerical intervals;

give an example of a problem that can be solved by a system of inequalities;

consider examples of solving systems of inequalities;

do independent work.

Forms of organizing educational activities:- frontal – collective – individual.

Methods: explanatory - illustrative.

Lesson plan:

1. Organizational moment, motivation, goal setting

2. Updating the study of the topic

3. Learning new material

4. Primary consolidation and application of new material

5. Doing independent work

7. Summing up the lesson. Reflection.

During the classes:

1. Organizational moment

Inequality can be a good helper. You just need to know when to turn to him for help. The formulation of problems in many applications of mathematics is often formulated in the language of inequalities. For example, many economic problems come down to the study of systems of linear inequalities. Therefore, it is important to be able to solve systems of inequalities. What does it mean to “solve a system of inequalities”? This is what we will look at today in class.

2. Updating knowledge.

Oral work with class, three students work using individual cards.

To review the theory of the topic “Inequalities and their properties,” we will conduct testing, followed by verification and a conversation on the theory of this topic. Each test task requires the answer “Yes” - figure, “No” - figure ____

The result of the test should be some kind of figure.

(answer: ).

Establish a correspondence between inequality and numerical interval

1. (– ; – 0,3)

2. (3; 18)

3. [ 12; + )

4. (– 4; 0]

5. [ 4; 12]

6. [ 2,5; 10)

“Mathematics teaches you to overcome difficulties and correct your own mistakes.” Find the error in solving the inequality, explain why the error was made, write down the correct solution in your notebook.

2x<8-6

x>-1

3. Studying new material.

What do you think is called a solution to a system of inequalities?

(The solution to a system of inequalities with one variable is the value of the variable for which each of the inequalities of the system is true)

What does it mean to “Solve a system of inequalities”?

(Solving a system of inequalities means finding all its solutions or proving that there are no solutions)

What needs to be done to answer the question “is a given number

solution to a system of inequalities?

(Substitute this number into both inequalities of the system, if the inequalities are true, then the given number is a solution to the system of inequalities, if the inequalities are incorrect, then the given number is not a solution to the system of inequalities)

Formulate an algorithm for solving systems of inequalities

1. Solve each inequality of the system.

2. Graphically depict the solutions to each inequality on the coordinate line.

3. Find the intersection of solutions to inequalities on the coordinate line.

4. Write the answer as a number interval.

Consider examples:

Answer:

Answer: no solutions

4. Securing the topic.

Working with textbook No. 1016, No. 1018, No. 1022

5. Independent work according to options (Task cards for students on the tables)

Independent work

Option 1

Solve the system of inequalities:

This article provides initial information about systems of inequalities. Here is a definition of a system of inequalities and a definition of a solution to a system of inequalities. The main types of systems that most often have to be worked with in algebra lessons at school are also listed, and examples are given.

Page navigation.

What is a system of inequalities?

It is convenient to define systems of inequalities in the same way as we introduced the definition of a system of equations, that is, by the type of notation and the meaning embedded in it.

Definition.

System of inequalities is a record that represents a certain number of inequalities written one below the other, united on the left by a curly brace, and denotes the set of all solutions that are simultaneously solutions to each inequality of the system.

Let us give an example of a system of inequalities. Let's take two arbitrary ones, for example, 2 x−3>0 and 5−x≥4 x−11, write them one below the other
2 x−3>0 ,
5−x≥4 x−11
and unite with a system sign - a curly brace, as a result we obtain a system of inequalities of the following form:

A similar idea is given about systems of inequalities in school textbooks. It is worth noting that their definitions are given more narrowly: for inequalities with one variable or with two variables.

Main types of systems of inequalities

It is clear that one can compose an infinite number various systems inequalities In order not to get lost in this diversity, it is advisable to consider them in groups that have their own features. All systems of inequalities can be divided into groups according to the following criteria:

by the number of inequalities in the system;
by the number of variables involved in the recording;
by the type of inequalities themselves.

Based on the number of inequalities included in the record, systems of two, three, four, etc. are distinguished. inequalities In the previous paragraph we gave an example of a system, which is a system of two inequalities. Let us show another example of a system of four inequalities .

Separately, we will say that there is no point in talking about a system of one inequality, in this case, essentially we're talking about about inequality itself, not about the system.

If you look at the number of variables, then there are systems of inequalities with one, two, three, etc. variables (or, as they also say, unknowns). Look at latest system inequalities written two paragraphs above. It is a system with three variables x, y and z. Please note that her first two inequalities do not contain all three variables, but only one of them. In the context of this system, they should be understood as inequalities with three variables of the form x+0·y+0·z≥−2 and 0·x+y+0·z≤5 respectively. Note that the school focuses on inequalities with one variable.

It remains to discuss what types of inequalities are involved in recording systems. At school, they mainly consider systems of two inequalities (less often - three, even less often - four or more) with one or two variables, and the inequalities themselves are usually entire inequalities first or second degree (less often - more high degrees or fractionally rational). But don’t be surprised if in your preparation materials for the Unified State Exam you come across systems of inequalities containing irrational, logarithmic, exponential and other inequalities. As an example, we give the system of inequalities , it is taken from .

What is the solution to a system of inequalities?

Let us introduce another definition related to systems of inequalities - the definition of a solution to a system of inequalities:

Definition.

Solving a system of inequalities with one variable is called such a value of a variable that turns each of the inequalities of the system into true, in other words, it is a solution to each inequality of the system.

Let's explain with an example. Let's take a system of two inequalities with one variable. Let's take the value of the variable x equal to 8, it is a solution to our system of inequalities by definition, since its substitution into the inequalities of the system gives two correct numerical inequalities 8>7 and 2−3·8≤0. On the contrary, unity is not a solution to the system, since when it is substituted for the variable x, the first inequality will turn into the incorrect numerical inequality 1>7.

Similarly, you can introduce the definition of a solution to a system of inequalities with two, three or more variables:

Definition.

Solving a system of inequalities with two, three, etc. variables called a pair, three, etc. values of these variables, which at the same time is a solution to every inequality of the system, that is, turns every inequality of the system into a correct numerical inequality.

For example, a pair of values x=1, y=2 or in another notation (1, 2) is a solution to a system of inequalities with two variables, since 1+2<7 и 1−2<0 - верные числовые неравенства. А пара (3,5, 3) не является решением этой системы, так как второе неравенство при этих значениях переменных дает неверное числовое неравенство 3,5−3<0 .

Systems of inequalities may have no solutions, may have a finite number of solutions, or may have an infinite number of solutions. People often talk about the set of solutions to a system of inequalities. When a system has no solutions, then there is an empty set of its solutions. When there are a finite number of solutions, then the set of solutions contains a finite number of elements, and when there are infinitely many solutions, then the set of solutions consists of an infinite number of elements.

Some sources introduce definitions of a particular and general solution to a system of inequalities, as, for example, in Mordkovich's textbooks. Under private solution of the system of inequalities understand her one single decision. In its turn general solution to the system of inequalities- these are all her private decisions. However, these terms make sense only when it is necessary to specifically emphasize what kind of solution we are talking about, but usually this is already clear from the context, so much more often they simply say “a solution to a system of inequalities.”

From the definitions of a system of inequalities and its solutions introduced in this article, it follows that a solution to a system of inequalities is the intersection of the sets of solutions to all inequalities of this system.

Bibliography.

Algebra: textbook for 8th grade. general education institutions / [Yu. N. Makarychev, N. G. Mindyuk, K. I. Neshkov, S. B. Suvorova]; edited by S. A. Telyakovsky. - 16th ed. - M.: Education, 2008. - 271 p. : ill. - ISBN 978-5-09-019243-9.
Algebra: 9th grade: educational. for general education institutions / [Yu. N. Makarychev, N. G. Mindyuk, K. I. Neshkov, S. B. Suvorova]; edited by S. A. Telyakovsky. - 16th ed. - M.: Education, 2009. - 271 p. : ill. - ISBN 978-5-09-021134-5.
Mordkovich A. G. Algebra. 9th grade. In 2 hours. Part 1. Textbook for students of general education institutions / A. G. Mordkovich, P. V. Semenov. - 13th ed., erased. - M.: Mnemosyne, 2011. - 222 p.: ill. ISBN 978-5-346-01752-3.
Mordkovich A. G. Algebra and beginning of mathematical analysis. Grade 11. In 2 hours. Part 1. Textbook for students of general education institutions (profile level) / A. G. Mordkovich, P. V. Semenov. - 2nd ed., erased. - M.: Mnemosyne, 2008. - 287 p.: ill. ISBN 978-5-346-01027-2.
Unified State Exam-2013. Mathematics: standard exam options: 30 options / ed. A. L. Semenova, I. V. Yashchenko. – M.: Publishing House “National Education”, 2012. – 192 p. – (USE-2013. FIPI - school).

The topic of the lesson is “Solving inequalities and their systems” (mathematics grade 9)

Lesson type: lesson on systematization and generalization of knowledge and skills

Lesson technology: technology for the development of critical thinking, differentiated learning, ICT technologies

The purpose of the lesson: repeat and systematize knowledge about the properties of inequalities and methods for solving them, create conditions for developing the skills to apply this knowledge when solving standard and creative problems.

Tasks.

Educational:

contribute to the development of students’ skills to generalize acquired knowledge, conduct analysis, synthesis, comparisons, and draw the necessary conclusions

organize the activities of students to apply the acquired knowledge in practice

promote the development of skills to apply acquired knowledge in non-standard conditions

Educational:

continue the formation of logical thinking, attention and memory;

improve skills of analysis, systematization, generalization;

creating conditions that ensure the development of self-control skills in students;

promote the acquisition of the necessary skills for independent learning activities.

Educational:

cultivate discipline and composure, responsibility, independence, critical attitude towards oneself, and attentiveness.

Planned educational results.

Personal: responsible attitude to learning and communicative competence in communication and cooperation with peers in the process of educational activities.

Cognitive: the ability to define concepts, create generalizations, independently select grounds and criteria for classification, build logical reasoning, and draw conclusions;

Regulatory: the ability to identify potential difficulties when solving an educational and cognitive task and find means to eliminate them, evaluate one’s achievements

Communicative: the ability to make judgments using mathematical terms and concepts, formulate questions and answers during the task, exchange knowledge between group members to make effective joint decisions.

Basic terms and concepts: linear inequality, quadratic inequality, system of inequalities.

Equipment

Projector, teacher's laptop, several netbooks for students;

Presentation;

Cards with basic knowledge and skills on the topic of the lesson (Appendix 1);

Cards with independent work (Appendix 2).

Lesson Plan

During the classes

Technological stages. Target.

Teacher activities

Student activities

Introductory and motivational component

1.Organizational Goal: psychological preparation for communication.

Hello. Nice to see you all.

Sit down. Check if you have everything ready for the lesson. If everything is okay, then look at me.

They say hello.

Check accessories.

Getting ready for work.

Personal. A responsible attitude towards learning is formed.

2.Updating knowledge (2 min)

Goal: identify individual knowledge gaps on a topic

The topic of our lesson is “Solving inequalities with one variable and their systems.” (slide 1)

Here is a list of basic knowledge and skills on the topic. Assess your knowledge and skills. Place the appropriate icons. (slide 2)

Assess their own knowledge and skills. (Annex 1)

Regulatory

Self-assessment of your knowledge and skills

3.Motivation

(2 minutes)

Purpose: to provide activities to determine lesson goals .

In the OGE work in mathematics, several questions in both the first and second parts determine the ability to solve inequalities. What do we need to repeat in class to successfully complete these tasks?

They reason and name questions for repetition.

Cognitive. Identify and formulate a cognitive goal.

Conception stage (content component)

4.Self-esteem and choice of trajectory

(1-2 min)

Depending on how you assessed your knowledge and skills on the topic, choose the form of work in the lesson. You can work with the whole class with me. You can work individually on netbooks, using my consultation, or in pairs, helping each other.

Determined with an individual learning path. If necessary, change places.

Regulatory

identify potential difficulties when solving an educational and cognitive task and find means to eliminate them

5-7 Work in pairs or individually (25 min)

The teacher advises students working independently.

Students who know the topic well work individually or in pairs with a presentation (slides 4-10) Complete assignments (slides 6,9).

Cognitive

ability to define concepts, create generalizations, build a logical chain

Regulatory the ability to determine actions in accordance with the educational and cognitive task

Communication ability to organize educational cooperation and joint activities, work with a source of information

Personal responsible attitude to learning, readiness and ability for self-development and self-education

5. Solving linear inequalities.

(10 min)

What properties of inequalities do we use to solve them?

Can you distinguish between linear and quadratic inequalities and their systems? (slide 5)

How to solve linear inequality?

Follow the solution. (slide 6) The teacher monitors the solution at the board.

Check the correctness of the solution.

Name the properties of inequalities; after the answer or in case of difficulty, the teacher opens slide 4.

Name the distinctive features of inequalities.

Using the properties of inequalities.

One student solves inequality No. 1 at the board. The rest are in notebooks, following the answerer’s decision.

Inequalities No. 2 and 3 are satisfied independently.

They check the ready answer.

Cognitive

Communication

6. Solving quadratic inequalities.

(10 min)

How to solve inequality?

What kind of inequality is this?

What methods are used to solve quadratic inequalities?

Let's remember the parabola method (slide 7). The teacher recalls the stages of solving an inequality.

The interval method is used to solve inequalities of the second and higher degrees. (slide 8)

To solve quadratic inequalities, you can choose a method that is convenient for you.

Solve the inequalities. (slide 9).

The teacher monitors the progress of the solution and recalls methods for solving incomplete quadratic equations.

The teacher advises individually working students.

Answer: We solve quadratic inequalities using the parabola method or the interval method.

Students follow up on the presentation solution.

At the board, students take turns solving inequalities No. 1 and 2. They check the answer. (to solve nerve No. 2, you need to remember the method for solving incomplete quadratic equations).

Inequality No. 3 is solved independently and checked against the answer.

Cognitive

the ability to define concepts, create generalizations, build reasoning from general patterns to particular solutions

Communication the ability to present a detailed plan of one’s own activities orally and in writing;

7. Solving systems of inequalities

(4-5 min)

Remember the stages of solving a system of inequalities.

Solve the system (Slide 10)

Name the stages of the solution

The student solves at the board and checks the solution on the slide.

Reflective-evaluative stage

8.Control and testing of knowledge

(10 min)

Goal: to identify the quality of learning the material.

Let's test your knowledge on the topic. Solve the problems yourself.

The teacher checks the result using ready-made answers.

Perform independent work on options (Appendix 2)

Having completed the work, the student reports this to the teacher.

The student determines his grade according to the criteria (slide 11). If the work is successfully completed, he can begin an additional task (slide 11)

Cognitive. Build logical chains of reasoning.

9.Reflection (2 min)

Goal: adequate self-esteem of one’s capabilities and abilities, advantages and limitations is formed

Is there an improvement in the result?

If you still have questions, refer to the textbook at home (p. 120)

Assess their own knowledge and skills on the same piece of paper (Appendix 1).

Compare with self-esteem at the beginning of the lesson and draw conclusions.

Regulatory

Self-assessment of your achievements

10.Homework (2 min)

Goal: consolidation of the studied material.

Determine homework based on the results of independent work (slide 13)