Advertisements
Advertisements
Question
Factorise the following by taking out the common factors:
5a(x2 - y2) + 35b(x2 - y2)
Advertisements
Solution
5a(x2 - y2) + 35b(x2 - y2)
Here, the common factor is 5(x2 - y2).
Dividing throughout by 5(x2 - y2). we get
`(5"a"(x^2 - y^2))/(5(x^2 - y^2)) + (35"b"(x^2 - y^2))/(5(x^2 - y^2)`
= a + 7b
∴ 5a(x2 - y2) + 35b(x2 - y2)
= 5(x2 - y2)(a + 7b).
APPEARS IN
RELATED QUESTIONS
Find the common factors of the terms.
2y, 22xy
Factorise the following expression:
6p − 12q
Factorise the following expression:
5x2y − 15xy2
Factorise the following expression:
− 4a2 + 4ab − 4 ca
Factorise.
z − 7 + 7xy − xyz
Factorize the following:
5x − 15x2
Factorize the following:
72x6y7 − 96x7y6
Factorize the following:
2l2mn - 3lm2n + 4lmn2
Factorize the following:
ax2y + bxy2 + cxyz
Factories by taking out common factors :
xy(3x2 - 2y2) - yz(2y2 - 3x2) + zx(15x2 - 10y2)
Factories by taking out common factors :
2x(a - b) + 3y(5a - 5b) + 4z(2b - 2a)
Factorise : 4x4 + 9y4 + 11x2y2
Factorise : `x^2 + 1/x^2 - 3`
Factorise : (a2 - a) (4a2 - 4a - 5) - 6
Factorise:
5a2 - b2 - 4ab + 7a - 7b
Factorise : 9x 2 + 3x - 8y - 64y2
Factorise : `1/4 ( a + b )^2 - 9/16 ( 2a - b )^2`
Factorise : 2(ab + cd) - a2 - b2 + c2 + d2
Find the value of : ( 67.8 )2 - ( 32.2 )2
Factorise : a3b - a2b2 - b3
Factorise : 17a6b8 - 34a4b6 + 51a2b4
Factorise : (x + y)(a + b) + (x - y)(a + b)
factorise : 35a3b2c + 42ab2c2
factorise : x2y - xy2 + 5x - 5y
factorise : xy2 + (x - 1) y - 1
Factorise the following by taking out the common factor
9x5y3 + 6x3y2 – 18x2y
