NCERT Solutions for Class 10 Mathematics Chapter 4 Quadratic Equations

Q1

Define a quadratic equation and identify $a$ , $b$ , and $c$ in $2x^2+x-300=0$ .

A quadratic equation in

x

is

ax^2+bx+c=0

, where

a,b,c

are real numbers and

a\ne0

. In

2x^2+x-300=0

,

a=2

,

b=1

,

c=-300

.

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Q2

Solve $x^2-5x+6=0$ by factorisation.

Factorise:

x^2-5x+6=(x-2)(x-3)

. Therefore

(x-2)(x-3)=0

, so

x=2

or

x=3

.

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Q3

Explain the completing-the-square idea for solving a quadratic equation.

Completing the square rewrites a quadratic expression as a perfect square plus or minus a constant, so the equation can be solved by taking square roots.

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Q4

State the quadratic formula and the condition for real roots.

For

ax^2+bx+c=0

,

a\ne0

, the roots are

x=\frac{-b\pm\sqrt{b^2-4ac}}{2a}

. Real roots exist when

b^2-4ac\ge0

.

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Q5

Find the nature of roots of $2x^2-4x+3=0$ .

Here

a=2

,

b=-4

,

c=3

. Discriminant

D=b^2-4ac=16-24=-8<0

. Therefore the equation has no real roots.

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Q6

A rectangular hall has area $300\text{ m}^2$ and length one metre more than twice its breadth. Form the quadratic equation for its breadth.

Let breadth be

x

m. Length is

(2x+1)

m. Area

=x(2x+1)=300

, so

2x^2+x-300=0

.

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Quadratic Equations

All questions

Define a quadratic equation and identify $a$ , $b$ , and $c$ in $2x^2+x-300=0$ .

Solve $x^2-5x+6=0$ by factorisation.

Explain the completing-the-square idea for solving a quadratic equation.

State the quadratic formula and the condition for real roots.

Find the nature of roots of $2x^2-4x+3=0$ .

A rectangular hall has area $300\text{ m}^2$ and length one metre more than twice its breadth. Form the quadratic equation for its breadth.

Other Chapters

Quadratic Equations

All questions

Define a quadratic equation and identify aaa, bbb, and ccc in 2x2+x−300=02x^2+x-300=02x2+x−300=0.

Solve x2−5x+6=0x^2-5x+6=0x2−5x+6=0 by factorisation.

Explain the completing-the-square idea for solving a quadratic equation.

State the quadratic formula and the condition for real roots.

Find the nature of roots of 2x2−4x+3=02x^2-4x+3=02x2−4x+3=0.

A rectangular hall has area 300 m2300\text{ m}^2300 m2 and length one metre more than twice its breadth. Form the quadratic equation for its breadth.

Other Chapters

Define a quadratic equation and identify $a$ , $b$ , and $c$ in $2x^2+x-300=0$ .

Solve $x^2-5x+6=0$ by factorisation.

Find the nature of roots of $2x^2-4x+3=0$ .

A rectangular hall has area $300\text{ m}^2$ and length one metre more than twice its breadth. Form the quadratic equation for its breadth.