Factorise (i) a4 b4 (ii) p4 81 (iii) x4 (y + z)4 (iv) x4 - Maths - Factorisation

Question

Factorise
(i) a 4 − b 4
(ii) p 4 − 81
(iii) x 4 − (y +
z)4
(iv) x 4 − (x −
z)4
(v) a 4 − 2a 2
b 2 + b 4

Gopal Mohanty · Accepted Answer

(i) a4 − b4 =
(a2)2 −
(b2)2
= (a2 − b2)
(a2 + b2)
= (a − b) (a + b)
(a2 + b2)
(ii) p4 − 81 =
(p2)2 − (9)2
= (p2 − 9) (p2 +
9)
= [(p)2 − (3)2]
(p2 + 9)
= (p − 3) (p + 3) (p2 +
9)
(iii) x4 − (y +
z)4 = (x2)2 −
[(y +z)2]2
= [x2 − (y +
z)2] [x2 + (y +
z)2]
= [x − (y + z)][ x + (y
+ z)] [x2 + (y +
z)2]
= (x − y − z) (x +
y + z) [x2 + (y +
z)2]
(iv) x4 − (x −
z)4 = (x2)2 −
[(x − z)2]2
= [x2 − (x −
z)2] [x2 + (x −
z)2]
= [x − (x − z)] [x +
(x − z)] [x2 + (x
− z)2]
= z(2x − z) [x2 +
x2 − 2xz + z2]
= z(2x − z) (2x2
− 2xz + z2)
(v) a4 −
2a2b2 + b4 =
(a2)2 − 2 (a2)
(b2) + (b2)2
= (a2 −
b2)2
= [(a − b) (a +
b)]2
= (a − b)2 (a +
b)2

Factorise (i) a 4 − b 4 (ii) p 4 − 81 (iii) x 4 − (y + z)4 (iv) x 4 − (x − z)4 (v) a 4 − 2a 2 b 2 + b 4

Factorise

(i) a ⁴ − b ⁴

(ii) p ⁴ − 81

(iii) x ⁴ − (y + z)⁴

(iv) x ⁴ − (x − z)⁴

(v) a ⁴ − 2a ² b ² + b ⁴