WBBSE Solutions For Class 9 Maths Algebra Chapter 5 Factorisation

Algebra Chapter 5 Factorisation

⇒ By factorisation of a polynomial, it means that the polynomial should be represented as the product of two or more polynomials.

⇒ Each of the polynomials obtained is called a factor of the original one.

⇒ If f(x) = ax³ + bx + c, then we first find the zero of the polynomial.

⇒ Let f(α) = 0 then (x – α) is a factor of fx).

⇒ This method is called vanishing or trial or zero method.

⇒ We are going to use these formulae to factorise.

1. a² – b² = (a + b) (a – b)
2. a³ + b³ = (a + b) (a² – ab + b²)
3. a³ – b³ = (a – b) (a² + ab + b²)
4. a³ + b³ + c³ – 3abc = (a + b + c) (a² + b² +c – ab – bc – ca) = \(\frac{1}{2}\)(a + b + c ) {(a – b)² + (b − c)² + (c − a)²}
5. If a + b + c = 0 then a³ + b³ + c³ = 3abc
6. If a³ + b³ + c³ = 3 abc then either a + bc = 0 or a = b = c
7. For quadratic expressions, we break the middle term of factorise like x² + (a + b)x + ab = x² + ax + bx+ ab = x (x + a) + b (x + a) = (x + a) (x + b)

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Algebra Chapter 5 Factorisation True Or False

Example 1. (2a + 1) is a factor of 8a³+ 8a – 5.

Solution: The correct answer is False.

Example 2. x + \(\frac{3}{2}\) is a factor of 2x³ + x² – 9x – 9.

Solution: The correct answer is True.

Example 3. If f(x) = x³ + 3x – 4 then (x – 1) is a factor of x³ + 3x – 4

Solution: The correct answer is True.

Example 4. If a + b + c ≠ 0 and a³ +b³ + c³ =3abc then a ≠ b ≠ c

Solution: The correct answer is False.

Example 5. There are 6 factors of 1 – x¹²

Solution: The correct answer is True.

Example 6. Value of a³ +b³ + c³ – 3abc when a = 999, b = 998, c = 997 is 8982.

Solution: The correct answer is True.

Example 7. (x – a) (x – b) = x² + (a + b) x + ab

Solution: The correct answer is False.

Example 8. If x + y + z = 0 then x³ + y³ + z³ = -3xyz

Solution: The correct answer is False.

Example 9. x and (x + 9) are two factors of x² + 9x.

Solution: The correct answer is True.

Example 10. (x – 1) and (x² + x + 4) are two factors of x³ + 3x – 4.

Solution: The correct answer is True.

Algebra Chapter 5 Factorisation Fill In The Blanks

Example 1. 2x³ + x² – 9x – 9 = (2x + 3) x (______)

Solution: x²

Example 2. x² – 2ax + (a + b)(a – b) = (x – a – b) x (________)

Solution: x – a + b.

Example 3. 4x² – 12xy + 9y² + 2x – 3y =(2x – 3y) x (__________)

Solution: 2x – 3y + 1.

Example 4. x² + 5x + 6 = x² + x (_______) + 6

Solution: 3 + 2

Example 5. x² – 5x + 6 = x² – x (________) + 6

Solution: 3 + 2.

Example 6. a⁶ + 5a³ + 8 = (a²)³ + (_______)³+ 2³ -3a²(_______).2

Solution: -a, – a.

Example 7. (a – b)³ + (b – c)3 + (c – a)3 = 3 ______

Solution: (a – b)(b – c)(c – a).

Example 8. (80)³ – (20)³ – (60)³ = _______

Solution: 96000.

Example 9. If a – b = -1 then a³ – b³+ 3ab + 1 = _______

Solution: 0

Example 10. If a + b + c = 0 then a³ + b³ – 3abc + c³ = _______

Solution: 0

Algebra Chapter 5 Factorisation Short Answer Type Questions

Example 1. Simplify: \(\frac{\left(b^2-c^2\right)^3+\left(c^2-a^2\right)^3+\left(a^2-b^2\right)^3}{(b-c)^3+(c-a)^3+(a-b)^3}\)

Solution: \(b^2-c^2+c^2-a^2+a^2-b^2=0\)

∴ \(\left(b^2-c^2\right)^3+\left(c^2-a^2\right)^3+\left(a^2-b^2\right)^3\)

Similarly, \(3\left(b^2-c^2\right)\left(c^2-a^2\right)\left(a^2-b^2\right)\)

∴ \(\frac{\left(b^2-c^2\right)^3+\left(c^2-a^2\right)^3+\left(a^2-b^2\right)^3}{(b-c)^3+(c-a)^3+(a-b)^3}=\frac{3\left(b^2-c^2\right)\left(c^2-a^2\right)\left(a^2-b^2\right)}{3(b-c)(c-a)(a-b)}\)

= (b+c)(c+a)(a+b)

\(\frac{\left(b^2-c^2\right)^3+\left(c^2-a^2\right)^3+\left(a^2-b^2\right)^3}{(b-c)^3+(c-a)^3+(a-b)^3}\) = (b+c)(c+a)(a+b)

Example 2. Let us write the relation of a, b, c if a³ +b³ + c³ – 3abc = 0 and a + b + c ≠ 0.

Solution: a³ + b³ + c³ – 3abc

= \(\frac{1}{2}\) (a + b + c) {(a – b)² + (b − c)² + (c − a)²} = 0

⇒ Now, a + b + c ≠ 0

∴ (a – b)² + (b – c)² + (c – a)² = 0

⇒ If sum of the squares are zero, then each term is zero

∴ a – b = 0, a = b and b – c = 0, b = c

∴ a = b = c.

Example 3. If a² – b² = 224 or b are negative integers (a < b) then find the values of a and b.

Solution: a² – b² = 225 – 1 = (15)²– (1)²

⇒ or, a² – b² = (-15)² – (-1)²

⇒ a and b are negative integers and a < b

∴ a = -15, b = -1.

The values of a and b -15 and -1.

Example 4. Let us write the value of (x – a)³ + (x − b)³ + (x − c)³ – 3(x -a)(x – b)(x – c) if 3x = a + b + c.

Solution: Now x – a + x – b + x – c

= 3x – (a + b + c)

= 3x – 3x = 0

∴ (x – a)³ + (x – b)³ + (x−c)³ = 3(x − a)(x – b)(x – c)

⇒ or, (x – a)³ + (x – b)³ + (x – c)³ – 3 (x – a)(x – b)(x – c) = 0

The value of (x – a)³ + (x − b)³ + (x − c)³ – 3(x -a)(x – b)(x – c) is 0.

Example 5. Let us write the values of a and p if 2x² + px + 6 = (2x – a)(x-2)

Solution: 2x² + px + 6 = 2x² – 4x – ax + 2a

= 2x² + x (-4 – a) + 2a

⇒ Comparing both sides by coefficients of x and constant terms, we get 2a = 6, a = 3 and p = – 4- a = -4 – 3 = -7.

The values of a and p are 3 and -7 .

Example 6. Find the values of (10)³ – 5³ – 5³.

Solution: 10 + (-5) + (-5) = 0

∴ (10)³ + (-5)³ + (-5)³ =3.10(-5)(-5) = 750

The values of (10)³ – 5³ – 5³ = 750

Example 7. Find the value of \(\frac{10^3+5^3}{10^2-25}\)

Solution: \(\frac{10^3+5^3}{10^2-25}=\frac{(10+5)\left(10^2-10 \times 5+5^2\right)}{10^2-5 \times 10+5^2}\)

= 10 + 5 = 15

The value of \(\frac{10^3+5^3}{10^2-25}\) = 15

Example 8. If a³ – 0.216 = (a – 0.6) (a² + 0.6a + k), then find the value of k.

Solution: a³ – 0.216 = (a – 0.6) (a² + 0.6a + (0.6)²}

∴ k = (0.6)² = 0.36

The value of k = 0.36

Example 9. Factorise 8x³ – y³ – 12xy + 6xy².

Solution: (2x)³ + (-y)³ – 6xy (2x – y)

= (2x)³ + (-y)³ + 3 x 2x (-y) (2x + (-y)}

= (2x – y)³ = (2x – y) (2x – y)(2x – y)

8x³ – y³ – 12xy + 6xy² = (2x – y)³ = (2x – y) (2x – y)(2x – y)

Example 10. If x + y = – 4 then find the value of x³ + y³ – 12xy + 64.

Solution: x³ + y³ – 12xy + 64

= x³ + y³ + 4³ – 3xy x 4

= (x + y + 4) (x² + y² + 16 – xy – 4x – 4y)

= 0 x (x² + y² + 16 – xy – 4x – 4y) = 0

The value of x³ + y³ – 12xy + 64 = 0