196-NCERT New Syllabus Grade 10 Quadratic Equation Ex-4.2

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NCERT New Syllabus Mathematics

Class: 10

Exercise 4.2

Topic: Quadratic Equation

Understanding Quadratic Equations in the New NCERT Syllabus for Class 10

Quadratic equations form a fundamental concept in algebra, crucial for building a strong mathematical foundation. In the new Class 10 syllabus of NCERT, quadratic equations take center stage, preparing students to solve real-world problems efficiently using algebraic techniques.

A quadratic equation is a polynomial equation of degree two, expressed in the form:

ax² + bx + c = 0 where a, b, and c are real numbers, with a ≠ 0.

In this blog, we will explore the various methods of solving quadratic equations, including factorization, completing the square, and the quadratic formula. We’ll also dive into the geometric significance of these equations and how they apply to practical scenarios.

Let’s start by breaking down the key components of quadratic equations and how to solve them step by step!

EXERCISE 4.2

Q1. Find the roots of the following quadratic equations by factorisation:

(i) x² – 3x – 10 = 0     (ii) 2x² + x – 6 = 0

(iii) √2 x² + 7 x + 5√2 = 0     (iv) 2x² – x + 1/8 = 0

(v) 100x² – 20x + 1 = 0 

Explanation:

1) The quadratic equation is of the form ax² + bx + c = 0, where a ≠ 0.

2) If α and β are the roots of the equation ax² + bx + c = 0, they satisfy the

conditions: 

aα² + bα + c = 0 and aβ² + bβ + c = 0. This means α and β are the solutions to the equation ax² + bx + c = 0.

3) We can solve this quadratic equation ax² + bx + c = 0 using the factorisation

method, which involves breaking the middle term to find the roots.

Solution:

(i) x² – 3x – 10 = 0

1) Quadratic equation: x² – 3x – 10 = 0.

To factorize, note that the constant term is 10, and since its sign is negative, we need factors of 10 whose difference equals – 3.

The factors of 10 are (– 5) and (2), because – 5 + 2 = – 3.

x² – 5x + 2x – 10 = 0

x(x – 5) + 2(x – 5) = 0

(x + 2)(x – 5) = 0

2) So, (x + 2) = 0 or (x – 5) = 0.

3) So, x = – 2 or x = 5.

(ii) 2x² + x – 6 = 0

1) Quadratic equation: 2x² + x – 6 = 0.

To factorize, note that the constant term is 6, and since its sign is negative, we need factors of 6 whose difference equals 1.

The factors of 6 are (– 3) and (4), because – 3 + 4 = 1.

2x² – 3x + 4x – 6 = 0

x(2x – 3) + 2(2x – 3) = 0

(x + 2)(2x – 3) = 0

2) So, (x + 2) = 0 or (2x – 3) = 0

3) So, x = – 2 or x = 3/2.

(iii) √2x² + 7x + 5√2 = 0

1) Quadratic equation: √2x² + 7x + 5√2 = 0

Here last term is 5√2 and its sign is positive. To factorize, we need to break down √2 x 5√2 in such a way

that their sum equals 7.

√2 x 5√2 = 5 x 2, and we need to find factors of 10 whose sum is 7. The factors of 10 are 5 and 2, because 5 + 2 = 7. Now we can use these factors to factorize the equation accordingly.

√2x² + 5x + 2x + 5√2 = 0

x(√2x + 5) + √2(√2x + 5) = 0

(√2x + 5)(x + √2) = 0

2) So, (√2x + 5) = 0, or (x + √2) = 0

3) So, x = (– 5√2/2) or x = – √2.

(iv) 2x² – x + 1/8 = 0

1) Consider the quadratic equation: 2x² – x + 1/8 = 0

2) Multiply the entire equation by 8 to eliminate the fraction: 16x² – 8x + 1 = 0.

The last term is 1, and its sign is positive. We need to factor 16 x 1 in such a way that their sum equals – 8. The factors of 16 that satisfy this condition are 

16 x 1 = (– 4) x (–4) (– 4 – 4 = – 8).

16x² – 4x – 4x + 1 = 0

4x(4x – 1) – (4x – 1) = 0

(4x – 1)(4x – 1) = 0

3) So, (4x – 1) = 0, or (4x – 1) = 0

4) So, x = 1/4 or x = 1/4.

(v) 100x² – 20x + 1 = 0

1)  Quadratic equation: 100x² – 20x + 1 = 0

The last term is 1 and its sign is positive. We need to factor 100 x 1 in such a way that their sum equals – 20. The factors of 100 x 1 = (– 10) x (– 10)

(– 10 – 10 = – 20).

100x² – 10x – 10x + 1 = 0

10x(10x – 1) – (10x – 1) = 0

(10x – 1)(10x – 1) = 0

2) So, (10x – 1) = 0, or (10x – 1) = 0

3) So, x = 1/10 or x = 1/10.

Q2. Solve the problems given in Example 1.

(i) John and Jivanti together have 45 marbles. Both of them lost 5 marbles each, and the product of the number of marbles they now have is 124. We would like to find out how many marbles they had to start with.

(ii) A cottage industry produces a certain number of toys in a day. The cost of production of each toy (in rupees) was found to be 55 minus the number of toys produced in a day. On a particular day, the total cost of production was Rs 750. We would like to find out the number of toys produced on that day.

Explanation:

1) A quadratic equation is of the form ax² + bx + c = 0, where a ≠ 0.

2) Use the given conditions to frame the quadratic equation in this standard form.

3) To solve the quadratic equation ax² + bx + c = 0, apply the factorisation method:

Identify two numbers whose product is $a\times c$ and whose sum is $b$.

Split the middle term using these numbers and factor by grouping.

Solve the resulting linear factors to find the values of $x$.

 

Solution:

(i) John and Jivanti together have 45 marbles. Both of them lost 5 marbles each, and the product of the number of marbles they now have is 124. We would like to find out how many marbles they had to start with.

1) Let the number of marbles John has to be x.

2) According to the problem, Jivanti has (45 – x) marbles.

3) After both lose 5 marbles, John has (x – 5) marbles, and Jivanti has (40 – x)

marbles.

4) Based on the given condition, their current number of marbles satisfies the

equation:

(x – 5)(40 – x) = 124

x(40 – x) – 5(40 – x) = 124
40x – x² – 200 + 5x = 124
– x² + 40x + 5x – 200 – 124 = 0
– x² + 45x – 324 = 0
x² – 45x + 324 = 0

5)  Quadratic equation: x² – 45x + 324 = 0.

The last term is 324 and its sign is positive. We need to factor 324 x 1 in such a way that their sum equals – 45. The factors of 324 x 1 = (– 36) x (– 9)

(– 36 – 9 = – 45).

x² – 36x – 9x + 324 = 0

x(x – 36) – 9(x – 36) = 0

(x – 36)(x – 9) = 0

6) So, (x – 36) = 0, or (x – 9) = 0

7) So, x = 9 or x = 36.

8) John has 36 marbles, and Jivanti has 9.

(ii) A cottage industry produces a certain number of toys in a day. The cost of

production of each toy (in rupees) was found to be 55 minus the number of toys produced in a day. On a particular day, the total cost of production was Rs 750. We would like to find out the number of toys produced on that day.

1) Let the number of toys produced in a day be x.

2) The cost of producing each toy is Rs (55 – x).

3) On a certain day, the total production cost amounted to Rs 750.

4) According to the given condition, the total cost equation can be written as:

x(55 – x) = 750

55x – x² = 750
55x – x² – 750 = 0
– x² + 55x – 750 = 0

x² – 55x + 750 = 0

5)  Quadratic equation: x² – 55x + 750 = 0.

The last term is 750 and its sign is positive. We need to factor 750 x 1 in such a way that their sum equals – 55. The factors of 750 x 1 = (– 25) x (– 30)

(– 25 – 30 = – 55).

x² – 25x – 30x + 750 = 0

x(x – 25) – 30(x – 25) = 0

(x – 25)(x – 30) = 0

6) So, (x – 25) = 0, or (x – 30) = 0

7) So, x = 25 or x = 30.

8) Hence, the number of toys produced that day is 25 or 30.

Q3. Find two numbers whose sum is 27 and whose product is 182.

1) Let the first number be x.

2) The second number is (27 – x).

3) Based on the given condition, the product of these two numbers is 182. Thus, the

equation becomes:

x(27 – x) = 182

27x – x² = 182
27x – x² – 182 = 0
– x² + 27x – 182 = 0

x² – 27x + 182 = 0

4)  Quadratic equation: x² – 27x + 182 = 0.

The last term is 182 and its sign is positive. We need to factor 182 x 1 in such a way that their sum equals – 27. The factors of 182 x 1 = (– 14) x (– 13)

(– 14 – 13 = – 27).

x² – 14x – 13x + 182 = 0

x(x – 14) – 13(x – 14) = 0

(x – 14)(x – 13) = 0

5) So, (x – 14) = 0, or (x – 13) = 0

6) So, x = 13 or x = 14.

7) Hence, the numbers are 13 and 14.

Q4. Find two consecutive positive integers, the sum of whose squares is 365.

1) Let the first positive integer be x.

2) The second consecutive integer will be (x + 1).

3) According to the problem, the sum of their squares is 365, so we can write the

equation:

x² + (x + 1)² = 365

x² + x² + 2x + 1 = 365

2x² + 2x – 365 + 1 = 0

2x² + 2x – 364 = 0 

x² + x – 182 = 0

4)  Quadratic equation: x² + x – 182 = 0.

The last term is 182 and its sign is negative. We need to factor 182 x 1 in such a way that the difference between the factors is 1. The factors of 

182 x 1 = (14) x (– 13)

(14 – 13 = 1).

x² + 14x – 13x – 182 = 0

x(x + 14) – 13(x + 14) = 0

(x + 14)(x – 13) = 0

6) So, (x + 14) = 0, or (x – 13) = 0

7) So, x = –14 or x = 13.

8) As our integer is positive, we have x = 13. 

9) Thus, the two consecutive positive integers are 13 and 14.

Q 5. The altitude of a right triangle is 7 cm less than its base. If the hypotenuse is 13 cm, find the other two sides.

1) Here, a right triangle's altitude depends on its base, so let the base be x.

2) So, altitude will be (x – 7).

3) According to the problem,

x² + (x – 7)² = 13²

x² + x² – 14x + 49 = 13²

2x² – 14x + 49 = 169

2x² – 14x + 49 – 169 = 0

2x² – 14x – 120 = 0

x² – 7x – 60 = 0

4)  Quadratic equation: x² – 7x – 60 = 0.

The last term is 60 and its sign is negative. We need to factor 60 x 1 in such a way that the difference between the factors is – 7. The factors of 

60 x 1 = (12) x (5)

(5 – 12 = – 7).

x² + 5x – 12x – 60 = 0

x(x + 5) – 12(x + 5) = 0

(x + 5)(x – 12) = 0

6) So, (x + 5) = 0, or (x – 12) = 0

7) So, x = – 5 or x = 12.

8) As the sides of a triangle can't be negative, ignore x = – 5, so we have x = 12. 

9) So the base of a triangle is 12 and the altitude is 5.

Q6. A cottage industry produces a certain number of pottery articles in a day.

It was observed on a particular day that the cost of production of each article (in rupees) was 3 more than twice the number of articles produced on that day. If the total cost of production on that day was Rs 90, find the number of articles produced and the cost of each article.

1) Let the number of pottery articles produced in a day be x.

2) So, the cost of production of each article will be Rs (2x + 3).

3) On one particular day, the total cost was Rs 90.

4) According to the problem,

x(2x + 3) = 90

2x² + 3x = 90

2x² + 3x – 90 = 0

2x² + 3x – 90 = 0

5) Quadratic equation: 2x² + 3x – 90 = 0.

The last term is 90 and its sign is negative. We need to factor 90 x 1 in such a way that the difference between the factors is 3. The factors of 

90 x 1 = (15) x (– 12)

(15 – 12 = 3).

2x² + 15x – 12x + 90 = 0

x(2x + 15) – 6(2x + 15) = 0

(2x + 15)(x – 6) = 0

6) So, (2x + 15) = 0, or (x – 6) = 0

7) So, x = – 15/2 or x = 6.

8) As the number of articles produced can't be negative, so, x can't be – 15/2.

9) So the number of articles produced on that day is 6 and the cost of each

article is Rs 15.

Conclusion: Unlocking the Power of Quadratic Equations

As we conclude our exploration of Quadratic Equations, we’ve unlocked a crucial mathematical tool that helps us solve a variety of complex problems, from calculating areas to predicting trajectories. Mastering the factorization method, completing the square, and applying the quadratic formula equips you with versatile techniques to tackle challenges beyond the classroom. Embrace these concepts, as they lay the groundwork for higher-level math and real-world applications. Keep pushing your limits, and remember, every problem has a solution—just like every quadratic equation has its roots!

Related Hashtags: 

#NCERTMaths #QuadraticEquations #Class10Mathematics #NewSyllabus2024 #MathConcepts #PolynomialEquations #EquationSolving #MathematicsLearning #CBSEClass10 #Education #Algebra #MathForStudents #MathTips #MathPractice #MathGenius #NCERTClass10 #AlgebraSkills #RootsAndSolutions #MathExploration #FutureMathematicians #UnlockYourPotential

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NCERT New Syllabus Class 10 - Quadratic Equation Exercise 4.3

Anil Satpute

195-NCERT New Syllabus Grade 10 Quadratic Equation Ex-4.1

Click here to explore the previous ⇨ NCERT New Syllabus Class 10 - Pair of Linear Equations in Two Variables Exercise 3.3

NCERT New Syllabus Mathematics

Class: 10

Exercise 4.1

Topic: Quadratic Equation

Understanding Quadratic Equations in the New NCERT Syllabus for Class 10

Quadratic equations form a fundamental concept in algebra, crucial for building a strong mathematical foundation. In the new Class 10 syllabus of NCERT, quadratic equations take center stage, preparing students to solve real-world problems efficiently using algebraic techniques.

A quadratic equation is a polynomial equation of degree two, expressed in the form:

ax² + bx + c = 0 where a, b, and c are real numbers, with a ≠ 0.

In this blog, we will explore the various methods of solving quadratic equations, including factorization, completing the square, and the quadratic formula. We’ll also dive into the geometric significance of these equations and how they apply to practical scenarios.

Let’s start by breaking down the key components of quadratic equations and how to solve them step by step!

EXERCISE 4.1

1. Check whether the following are quadratic equations :

(i) (x + 1)² = 2(x – 3)                         (ii) x² – 2x = (–2) (3 – x)

(iii) (x – 2)(x + 1) = (x – 1)(x + 3)      (iv) (x – 3)(2x +1) = x(x + 5)

(v) (2x – 1)(x – 3) = (x + 5)(x – 1)     (vi) x² + 3x + 1 = (x – 2)²

(vii) (x + 2)³ = 2x (x² – 1)                  (viii) x³ – 4x² – x + 1 = (x – 2)³

Explanation:

1) A quadratic polynomial is expressed as ax² + bx + c, where a ≠ 0.

2) A quadratic equation takes the form ax² + bx + c = 0, where a ≠ 0.

3) Any equation of the form p(x) = 0, where p(x) is a polynomial of degree 2, is

called a quadratic equation.

4) The standard form of a quadratic equation is ax² + bx + c = 0, where a ≠ 0. 

The degree of this equation is 2.

Solution:

(i) (x + 1)² = 2(x – 3)

1) The given equation is:

(x + 1)² = 2(x – 3)

x² + 2x +1 = 2x – 6

x² + 2x +1 – 2x + 6 = 0

x² + 7 = 0 -------------------equation 1

2) Since the highest power of the variable x is 2, it confirms that this is a 

quadratic equation. 

(ii) x² – 2x = (– 2) (3 – x)

1) The given equation is:

x² – 2x = (–2) (3 – x)

x² – 2x = – 6 + 2x

x² – 2x + 6 – 2x = 0

x² – 4x + 6 = 0 -------------------equation 1

2) Since the highest power of the variable x is 2, it confirms that this is a

quadratic equation.  

(iii) (x – 2)(x + 1) = (x – 1)(x + 3)

1) The given equation is:

(x – 2)(x + 1) = (x – 1)(x + 3)

x(x + 1) – 2(x + 1) = x(x + 3) – (x + 3)

x² + x – 2x – 2 = x² + 3x – x – 3

x² – x – 2 = x² + 2x – 3
x² – x – 2 – x² – 2x + 3 = 0

– 3x + 1 = 0
3x – 1 = 0 -------------------equation 1

2) Since the highest power of the variable x is 1, it is not the quadratic equation. 

(iv) (x – 3)(2x + 1) = x(x + 5)

1) The given equation is:

(x – 3)(2x +1) = x(x + 5)

x(2x + 1) – 3(2x + 1) = x(x + 5)

2x² + x – 6x – 3 = x² + 5x

2x² + x – 6x – 3 – x² – 5x = 0

x² – 10x – 3 = 0 -------------------equation 1

2) Since the highest power of the variable x is 2, it confirms that this is a

quadratic equation.  

(v) (2x – 1)(x – 3) = (x + 5)(x – 1)

1) The given equation is:

(2x – 1)(x – 3) = (x + 5)(x – 1)

2x(x – 3) – (x – 3) = x(x – 1) + 5(x – 1)

2x² – 6x – x + 3 = x² – x + 5x – 5

2x² – 6x – x + 3 – x² + x – 5x + 5 = 0

2x² – x² – 6x – x + x – 5x + 3 + 5 = 0

x² – 11x + 8 = 0 -------------------equation 1

2) Since the highest power of the variable x is 2, it confirms that this is a

quadratic equation.  

(vi) x² + 3x + 1 = (x – 2)²

1) The given equation is:

x² + 3x + 1 = (x – 2)²

x² + 3x + 1 = x² – 4x + 4

x² + 3x + 1 – x² + 4x – 4 = 0

x² – x² + 3x + 4x + 1 – 4 = 0

7x – 3 = 0-------------------equation 1

2) Since the highest power of the variable x is 1, it is not the quadratic equation.

(vii) (x + 2)³ = 2x (x² – 1)

1) We know that (a + b)³ = a³ + 3a² b + 3a b² + b³ 

(x + 2)³ = 2x (x² – 1)

x³ + 3x² (2) + 3x (2)² + 2³ = 2x³ – 2x

x³ + 6x² + 12x + 8 = 2x³ – 2x

x³ + 6x² + 12x + 8 – 2x³ + 2x = 0
x³ – 2x³ + 6x² + 12x + 2x + 8 = 0

– x³ + 6x² + 14x + 8 = 0 -------------------equation 1

2) Since the highest power of the variable x is 3, it is not the quadratic equation.

(viii) x³ – 4x² – x + 1 = (x – 2)³

1) We know that (a – b)³ = a³ – 3a² b + 3a b² – b³ 

x³ – 4x² – x + 1 = (x – 2)³

x³ – 4x² – x + 1 = x³ – 3x² (2) + 3x (2)² – 2³

x³ – 4x² – x + 1 = x³ – 6x² + 12x – 8

x³ – 4x² – x + 1 – x³ + 6x² – 12x + 8 = 0
x³ – x³ – 4x² + 6x² – x – 12x + 1 + 8 = 0

2x² – 13x + 9 = 0 -------------------equation 1

2) Since the highest power of the variable x is 2, it confirms that this is indeed a

quadratic equation.

Q2. Represent the following situations in the form of quadratic equations :

(i) The area of a rectangular plot is 528 m². The length of the plot (in metres) is one more than twice its breadth. We need to find the length and breadth of the plot.

(ii) The product of two consecutive positive integers is 306. We need to find the integers.

(iii) Rohan’s mother is 26 years older than him. The product of their ages (in years) 3 years from now will be 360. We would like to find Rohan’s present age.

(iv) A train travels a distance of 480 km at a uniform speed. If the speed had been 8 km/h less, then it would have taken 3 hours more to cover the same distance. We need to find the speed of the train.

Explanation:

1) Let x be any suitable variable representing the unknown value.

2) Based on the given conditions, frame the quadratic equation in the standard

form ax² + bx + c = 0, where a ≠ 0.

3) Solve this quadratic equation using an appropriate method (such as factorization,

completing the square, or the quadratic formula) to find the required solutions. 

Solution:

(i) The area of a rectangular plot is 528 m². The length of the plot (in meters)

is one more than twice its breadth. We need to find the length and breadth of the plot.

1) Let the breadth of the plot be x meters, as the length depends on it.

2) According to the problem, the length is more than twice the breadth, 

so the length is (2x + 1) meters.

3) Given that the area of the plot is 528 m², we can write the equation for the area

as:

x(2x + 1) = 528

2x² + x = 528

2x² + x – 528 = 0 ------------ equation 1

4) Therefore, the required quadratic equation is: 

2x² + x – 528 = 0, where x is breadth (in metres) of the plot.

(ii) The product of two consecutive positive integers is 306. We need to find the integers.

1) Let the first integer be x.

2) The next consecutive integer will be (x + 1).

3) Since the product of the two integers is 306, we can write the equation as:

x(x + 1) = 306

x² + x = 306

x² + x – 306 = 0 ------------ equation 1

4) Therefore, the required quadratic equation is: x² + x – 306 = 0, where x is

the smaller integer.

(iii) Rohan’s mother is 26 years older than him. The product of their ages 

(in years) 3 years from now will be 360. We would like to find Rohan’s present age.

1) Let Rohan's current age be x.

2) According to the problem, his mother's age is (x + 26).

3) Three years later, Rohan's age will be (x + 3), and his mother's age will be 

(x + 29). 

4) From the given condition, the product of their ages after 3 years is 360:

(x + 3)(x + 29) = 360

x(x + 29) + 3(x + 29) = 360

x² + 29x + 3x + 87 = 360

x² + 32x + 87 = 360
x² + 32x + 87 – 360 = 0
x² + 32x – 273 = 0 ------------ equation 1

4) Therefore, the required quadratic equation is x² + 32x – 273 = 0. 

where x (in years) is the present age of Rohan.

(iv) A train travels a distance of 480 km at a uniform speed. If the speed had been 8 km/h less, then it would have taken 3 hours more to cover the same distance. We need to find the speed of the train.

1) Let the uniform speed of a train be x km/h.

2) To cover 480 km, the time taken will be (480/x) hrs.

3) If the speed is reduced by 8 km/h, then time will be increased by 3 hrs, so 

new speed = (x – 8) km/h, and new time = [(480/x) + 3] hrs.

4) According to the condition,

(x – 8)[(480/x) + 3] = 480

(x – 8)[(480 + 3x)/x] = 480

(x – 8)(480 + 3x) = 480x

x(480 + 3x) – 8(480 + 3x) = 480x

3x² + 480x – 3840 – 24x = 480x

3x² – 24x – 3840 = 0
x² – 8x – 1280 = 0 ------------ equation 1

5) The required quadratic equation is x² – 8x – 1280 = 0. 

where x (in km/h) is the speed of the train.

Conclusion: Unlocking the Power of Quadratic Equations

As we conclude our exploration of Quadratic Equations, we’ve unlocked a crucial mathematical tool that helps us solve a variety of complex problems, from calculating areas to predicting trajectories. Mastering the factorization method, completing the square, and applying the quadratic formula equips you with versatile techniques to tackle challenges beyond the classroom. Embrace these concepts, as they lay the groundwork for higher-level math and real-world applications. Keep pushing your limits, and remember, every problem has a solution—just like every quadratic equation has its roots!

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Click here to explore the next step ⇨ NCERT New Syllabus Class 10 - Quadratic Equation Exercise 4.2

Anil Satpute