(i) a²+8a+16

Ans:

Given: a²+8a+16         

Since, 8a and 16  can be substituted by 2×4×a and  4²  respectively we get,

= a²+2×4×a+4²

Therefore, by using the identity : (x+y)² = x²+2xy+y²

a²+8a+16 = (a+4)²

(ii) p²–10p+25

Ans:

Given: p²–10p+25          

Since, 10p and 25 can be substituted by  2×5×p and 5² respectively we get, 

= p²-2×5×p+5²

Therefore, by using the identity : (x-y)² = x²-2xy+y²

p²–10p+25 = (p-5)²

(iii) 25m²+30m+9

Ans:

Given: 25m²+30m+9         

Since, 25m² , 30m and  9 can be substituted by (5m)², 2×5m×3 and 3² respectively we get,  

= (5m)² + 2×5m×3 + 3²

Therefore, by using the identity: (x+y)² = x²+2xy+y²

25m²+30m+9 = (5m+3)²

(iv) 49y²+84yz+36z²

Ans:

Given: 49y²+84yz+36z²         

Since, 49y², 84yz and 36z² can be substituted by (7y)², 2×7y×6z and (6z)²  respectively we get,

=(7y)²+2×7y×6z+(6z)²

Therefore, by using the identity: (x+y)² = x²+2xy+y²

49y²+84yz+36z² = (7y+6z)²

(v) 4x²–8x+4

Ans:

Given: 4x²–8x+4         

Since, 4x², 8x and 4 can be substituted by (2x)², 2×4x and 2² respectively we get,

= (2x)²-2×4x+2²

Therefore, by using the identity: (x-y)² = x²-2xy+y²

4x²–8x+4 = (2x-2)²

(vi) 121b²-88bc+16c²

Ans:

Given: 121b²-88bc+16c²          

Since, 121b², 88bc and 16c² can be substituted by (11b)², 2×11b×4c and (4c)² respectively we get,

= (11b)²-2×11b×4c+(4c)²

Therefore, by using the identity: (x-y)² = x²-2xy+y²

121b²-88bc+16c² = (11b-4c)²

(vii) (l+m)²-4lm (Hint: Expand (l+m)² first)

Ans:

Given: (l+m)²-4lm         

By expanding (l+m)² using identity: (x+y)² = x²+2xy+y² , we get,

(l+m)²-4lm = l²+m²+2lm-4lm

(l+m)²-4lm = l²+m²-2lm  =  l²-2lm+m² 

Therefore, by using the identity: (x-y)² = x²-2xy+y²

(l+m)²-4lm = (l-m)²

(viii) a⁴+2a²b²+b⁴

Ans:

Given: a⁴+2a²b²+b⁴         

Since, a⁴ and b⁴ can be substituted by (a²)² and (b²)² respectively we get,

= (a²)²+2×a²×b²+(b²)²

Therefore, by using the identity: (x+y)² = x²+2xy+y²

a⁴+2a²b²+b⁴ = (a²+b²)²

(i) 4p²–9q²

Ans: 

Given: 4p²–9q²          

Since, 4p² and 9q² can be substituted by (2p)² and (3q)² respectively we get,

= (2p)²-(3q)²

Therefore, by using the identity: x²-y² = (x+y)(x-y)

4p²–9q² = (2p-3q)(2p+3q)

(ii) 63a²–112b²

Ans:

Given: 63a²–112b²          

63a²–112b² = 7(9a² –16b²)

Since, 9a² and 16b² can be substituted by (3a)² and (4b)² respectively we get,

= 7((3a)²–(4b)²)

Therefore, by using the identity: x²-y² = (x+y)(x-y)

= 7(3a+4b)(3a-4b)

(iii) 49x²–36

Ans:

Given: 49x²–36         

Since, 49x² and 36 can be substituted by (7x)² and 6² respectively we get,

= (7x)² – 6²

Therefore, by using the identity: x²-y² = (x+y)(x-y)

49x²–36 = (7x+6)(7x–6)

(iv) 16x⁵–144x³

Ans:

Given:  16x⁵ – 144x³        

16x⁵ – 144x³ = 16x³(x²–9)

Since, 9 can be substituted by 3²  respectively we get,

= 16x³(x²–3²)

Therefore, by using the identity: x²-y² = (x+y)(x-y)

16x⁵–144x³ = 16x³(x–3)(x+3)

(v) (l+m)² – (l-m)²

Ans:

Given: (l+m)² – (l-m)²         

By expanding (l+m)² – (l-m)² using identity: x²-y² = (x+y)(x-y) , we get,

= {(l+m)-(l–m)}{(l +m)+(l–m)}

= (l+m–l+m)(l+m+l–m)

= (2m)(2l)

(l+m)² – (l-m)² = 4 ml

(vi) 9x²y²–16

Ans:

Given: 9x²y²–16        

Since, 9x²y² and 16 can be substituted by (3xy)² and 4² respectively we get,

= (3xy)²-4²

Therefore, by using the identity: x²-y² = (x+y)(x-y)

9x²y²–16 = (3xy–4)(3xy+4)

(vii) (x²–2xy+y²)–z²

Ans:

Given: (x²–2xy+y²)–z²          

By compressing x²–2xy+y² using identity: (x-y)² = x²-2xy+y² , we get,

(x²–2xy+y²)–z² = (x–y)²–z²

Therefore, by using the identity: x²-y² = (x+y)(x-y)

= {(x–y)–z}{(x–y)+z}

(x²–2xy+y²)–z² = (x–y–z)(x–y+z)

(viii) 25a²–4b²+28bc–49c²

Ans:

Given: 25a²–4b²+28bc–49c²

25a²–4b²+28bc–49c² = 25a²–(4b²-28bc+49c² )  

Since, 25a², 4b², 28bc and 49c² can be substituted by (5a)², (2b)², 2(2b)(7c) and (7c)² respectively we get,

= (5a)²-{(2b)²-2(2b)(7c)+(7c)²}

Therefore, by using the identity: (x-y)² = x²-2xy+y²

= (5a)²-(2b-7c)²

and by using Identity: x²-y² = (x+y)(x-y) , we get

25a²–4b²+28bc–49c² = (5a+2b-7c)(5a-2b+7c)

(i) ax²+bx

Ans:

Given: ax²+bx

Taking x as common, we get 

ax²+bx = x(ax+b)

(ii) 7p²+21q² 

Ans:

Given: 7p²+21q² 

Taking 7  as common, we get, 

7p²+21q² = 7(p²+3q²)

(iii) 2x³+2xy²+2xz² 

Ans:

Given: 2x³+2xy²+2xz² 

Taking 2x as common, we get,

2x³+2xy²+2xz²  = 2x(x²+y²+z²)

(iv) am²+bm²+bn²+an² 

Ans:

Given: am²+bm²+bn²+an²

Taking m2 and n2 as common, we get,

= m²(a+b)+n²(a+b) 

Taking (a+b) as common, we get,

am²+bm²+bn²+an² = (a+b)(m²+n²)

(v) (lm+l)+m+1

Ans:

Given: (lm+l)+m+1 

= lm+m+l+1

Taking m as common, we get,

= m(l+1)+(l+1) 

(lm+l)+m+1 = (m+1)(l+1)

(vi) y(y+z)+9(y+z) 

Ans:

Given: y(y+z)+9(y+z) 

Taking  (y+z) as common, we get,

y(y+z)+9(y+z) = (y+9)(y+z)

(vii) 5y²–20y–8z+2yz 

Ans:

Given: 5y²–20y–8z+2yz

Taking 5y and 2z as common, we get,

= 5y(y–4)+2z(y–4) 

Taking (y-4) as common, we get,

5y²–20y–8z+2yz = (y–4)(5y+2z)

(viii) 10ab+4a+5b+2 

Ans:

Given: 10ab+4a+5b+2 

Taking 5b and 2 as common, we get,

= 5b(2a+1)+2(2a+1) 

Taking (2a+1) as common, we get,

10ab+4a+5b+2 = (2a+1)(5b+2)

(ix) 6xy–4y+6–9x 

Ans:

Given: 6xy–4y+6–9x

= 6xy–9x–4y+6

Taking 3x and 2 as common, we get,

= 3x(2y–3)–2(2y–3) 

Taking (2y-3) as common, we get,

6xy–4y+6–9x = (2y–3)(3x–2)

(i) a⁴–b⁴

Ans:

Given: a⁴–b⁴

Since, a⁴ and b⁴ can be substituted by (a²)² and (b²)² respectively we get,

= (a²)²-(b²)²

Therefore, by using Identity: x²-y² = (x+y)(x-y) , we get

= (a²-b²) (a²+b²)

a⁴–b⁴ = (a – b)(a + b)(a²+b²)

(ii) p⁴–81

Ans:

Given: p⁴–81

Since, p⁴ and 81 can be substituted by (p²)² and (9)² respectively we get,

= (p²)²-(9)²

Therefore, by using Identity: x²-y² = (x+y)(x-y) , we get

= (p²-9)(p²+9)

= (p²-3²)(p²+9)

p⁴–81 =(p-3)(p+3)(p²+9)

(iii) x⁴–(y+z)⁴ 

Ans:

Given: x⁴–(y+z)⁴

Since, x⁴ and (y+z)⁴ can be substituted by (x²)² and [(y+z)²]² respectively we get,

= (x²)²-[(y+z)²]²

Therefore, by using the identity: x²-y² = (x+y)(x-y) , we get

= {x²-(y+z)²}{ x²+(y+z)²}

= {(x –(y+z)(x+(y+z)}{x²+(y+z)²}

x⁴–(y+z)⁴  = (x–y–z)(x+y+z) {x²+(y+z)²}

(iv) x⁴–(x–z)⁴ 

Ans:  

Given: x⁴–(x–z)⁴ 

Since, x⁴ and (x-z)⁴ can be substituted by (x²)² and [(x-z)²]² respectively we get,

= (x²)²-{(x-z)²}²

By using Identity: x²-y² = (x+y)(x-y) , we get

= {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)

x⁴–(x–z)⁴ = z(2x-z)( 2x²-2xz+z²)

(v) a⁴–2a²b²+b⁴ 

Ans:

Given: a⁴–2a²b²+b⁴

Since, a⁴ and b⁴ can be substituted by (a²)² and (b²)² respectively we get,

= (a²)²-2a²b²+(b²)²

Therefore, by using the identity: (x-y)² = x²-2xy+y²

= (a²-b²)²

And by using Identity: x²-y² = (x+y)(x-y) , we get

a⁴–2a²b²+b⁴  = ((a–b)(a+b))²

(i) p²+6p+8

Ans:

Given: p²+6p+8 

Since, 6p and 8 can be substituted by 2p+4p and 4×2 respectively we get,

= p²+2p+4p+8

Taking p and 4 common terms, we get

= p(p+2)+4(p+2)

Again taking (p+2) as common, we get

= (p+2)(p+4)

p²+6p+8 = (p+2)(p+4)

(ii) q²–10q+21

Ans:

Given: q²–10q+21

Since, 10q and 21 can be substituted by (-3q)+(-7q) and (-3)×(-7) respectively we get,

= q²–3q-7q+21

Taking q and 7 common terms, we get

= q(q–3)–7(q–3)

Again taking (q–3) as common, we get

= (q–7)(q–3)

q²–10q+21 = (q–7)(q–3)

(iii) p²+6p–16

Ans:

Given: p²+6p+16

Since, 6p and 16 can be substituted by 8p +(-2p) and (-2)×8 respectively we get,

= p²–2p+8p–16

Taking p and 8 common terms, we get

= p(p–2)+8(p–2)

Again taking (p-2) as common, we get

= (p+8)(p–2)

p²+6p–16 = (p+8)(p–2)