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Exercise Set 4.1

Exercise 4.1 – Question 1

Identity used in all the questions here is –

(a+b)^2 = a^2 + 2ab + b^2

(i) $(7x+4y)^2$

Here, $a=7x,\ b=4y$
$=(7x)^2 + 2(7x)(4y) + (4y)^2$

$=49x^2 + 56xy + 16y^2 \ \text{Ans}$

(ii) $\left(\frac{7x}{5}+\frac{3y}{2}\right)^2$

Here,

$a=\frac{7x}{5},\ b=\frac{3y}{2}$ $=\left(\frac{7x}{5}\right)^2 + 2\left(\frac{7x}{5}\right)\left(\frac{3y}{2}\right) + \left(\frac{3y}{2}\right)^2$
$=\frac{49x^2}{25} + \frac{21xy}{5} + \frac{9y^2}{4} \ \text{Ans}$

(iii) $(2.5p+1.5q)^2$

Here, $a=2.5p,\ b=1.5q$

$=(2.5p)^2 + 2(2.5p)(1.5q) + (1.5q)^2$
$=6.25p^2 + 7.5pq + 2.25q^2 \ \text{Ans}$

(iv) $\left(\frac{3s}{4}+8t\right)^2$

Here, $a=\frac{3s}{4},\ b=8t$ $=\left(\frac{3s}{4}\right)^2 + 2\left(\frac{3s}{4}\right)(8t) + (8t)^2$
$=\frac{9s^2}{16} + 12st + 64t^2 \ \text{Ans}$

(v) $\left(x+\frac{1}{2y}\right)^2$

Here, $a=x,\ b=\frac{1}{2y}$

$=x^2 + 2x\left(\frac{1}{2y}\right) + \left(\frac{1}{2y}\right)^2$
$=x^2 + \frac{x}{y} + \frac{1}{4y^2} \ \text{Ans}$

(vi) $\left(\frac{1}{x}+\frac{1}{y}\right)^2$

Here, $a=\frac{1}{x},\ b=\frac{1}{y}$
$=\left(\frac{1}{x}\right)^2 + 2\left(\frac{1}{x}\right)\left(\frac{1}{y}\right) + \left(\frac{1}{y}\right)^2$
$=\frac{1}{x^2} + \frac{2}{xy} + \frac{1}{y^2} \ \text{Ans}$

Exercise Set 4.2

Factor completely:
(i) 9x² + 24xy + 16y²
(ii) 4s²+ 20st + 25t²
(iii) 49x²+ 28xy + 4y²
(iv) 64p²+32/3pq+4/9q²
(v) 3a² + 4ab +4/3 b²
(vi) 9/5s²+6sv+5v²

Solutions:

Direct Answers

(i) $(3x + 4y)^2$
(ii) $(2s + 5t)^2$
(iii) $(7x + 2y)^2$
(iv) $\left(8p + \frac{2}{3}q\right)^2$
(v) $\frac{1}{3}(3a + 2b)^2$
(vi) $\frac{1}{5}(3s + 5v)^2$

(i) $9x^2 + 24xy + 16y^2$

Now, using identity $a^2 + 2ab + b^2 = (a + b)^2$

We have, $9x^2 + 24xy + 16y^2 = (3x)^2 + 2 \times 3x \times 4y + (4y)^2$

So, $a = 3x,\quad b = 4y$

Hence,
$9x^2 + 24xy + 16y^2 = (3x + 4y)^2 \ \text{Ans}$

(ii) $4s^2 + 20st + 25t^2$

Now, using identity $a^2 + 2ab + b^2 = (a + b)^2$

We have, $4s^2 + 20st + 25t^2 = (2s)^2 + 2 \times 2s \times 5t + (5t)^2$

So, $a = 2s,\quad b = 5t$

Hence, $4s^2 + 20st + 25t^2 = (2s + 5t)^2 \ \text{Ans}$

(iii) $49x^2 + 28xy + 4y^2$

Now, using identity $a^2 + 2ab + b^2 = (a + b)^2$

We have, $49x^2 + 28xy + 4y^2 = (7x)^2 + 2 \times 7x \times 2y + (2y)^2$

So, $a = 7x,\quad b = 2y$

Hence, $49x^2 + 28xy + 4y^2 = (7x + 2y)^2 \ \text{Ans}$

(iv) $64p^2 + \frac{32}{3}pq + \frac{4}{9}q^2$

Now, using identity $a^2 + 2ab + b^2 = (a + b)^2$

We have, $64p^2 + \frac{32}{3}pq + \frac{4}{9}q^2 = (8p)^2 + 2 \times 8p \times \frac{2}{3}q + \left(\frac{2}{3}q\right)^2$

So, $a = 8p,\quad b = \frac{2}{3}q$

Hence, $64p^2 + \frac{32}{3}pq + \frac{4}{9}q^2 = \left(8p + \frac{2}{3}q\right)^2 \ \text{Ans}$

(v) $3a^2 + 4ab + \frac{4}{3}b^2$

Now, using identity $a^2 + 2ab + b^2 = (a + b)^2$

We have, $3a^2 + 4ab + \frac{4}{3}b^2 = \frac{1}{3}(9a^2 + 12ab + 4b^2)$ $= \frac{1}{3}\left[(3a)^2 + 2 \times 3a \times 2b + (2b)^2\right]$

So, $a = 3a,\quad b = 2b$

Hence, $3a^2 + 4ab + \frac{4}{3}b^2 = \frac{1}{3}(3a + 2b)^2 \ \text{Ans}$

(vi) $\frac{9}{5}s^2 + 6sv + 5v^2$

Now, using identity $a^2 + 2ab + b^2 = (a + b)^2$

We have, $\frac{9}{5}s^2 + 6sv + 5v^2 = \frac{1}{5}(9s^2 + 30sv + 25v^2)$ $= \frac{1}{5}\left[(3s)^2 + 2 \times 3s \times 5v + (5v)^2\right]$

So, $a = 3s,\quad b = 5v$

Hence, $\frac{9}{5}s^2 + 6sv + 5v^2 = \frac{1}{5}(3s + 5v)^2 \ \text{Ans}$

2. Find the values of the following using the identity
(a – b)² = a² – 2ab + b².
(i) (79)² (ii) (193)² (iii) (299)²

Final Answers

(i) 6241
(ii) 37249
(iii) 89401

(i) $79^2$

Now, using identity,

(a-b)^2 = a^2 – 2ab + b^2

We have,
$79 = 80 – 1$ $79^2 = (80 – 1)^2$ $= (80)^2 – 2 \times 80 \times 1 + (1)^2$
We have, $79 = 80 – 1$ $79^2 = (80 – 1)^2$ $= (80)^2 – 2 \times 80 \times 1 + (1)^2$

So, $a = 80,\quad b = 1$ $= 6400 – 160 + 1 = 6241$

Hence, $79^2 = 6241 \ \text{Ans}$

(ii) $193^2$

Now, using identity

$(a-b)^2 = a^2 – 2ab + b^2$

$193^2 = (200 – 7)^2$ $= (200)^2 – 2 \times 200 \times 7 + (7)^2$

So, $a = 200,\quad b = 7$ $= 40000 – 2800 + 49 = 37249$

Hence, $193^2 = 37249 \ \text{Ans}$

(iii) $299^2$

Now, using identity

$(a-b)^2 = a^2 – 2ab + b^2$

We have, $299 = 300 – 1$ $299^2 = (300 – 1)^2$ $= (300)^2 – 2 \times 300 \times 1 + (1)^2$

So, $a = 300,\quad b = 1$ $= 90000 – 600 + 1 = 89401$

Hence, $299^2 = 89401 \ \text{Ans}$

Exercise Set 4.3

Important identities:

(a + b)² = a² + 2ab + b²
(a – b)² = a²– 2ab + b²
(a + b + c)² = a²+ b²+ c²+ 2ab + 2bc + 2ca

Find the following squares using one of the above identities.
Determine which of these identities will make these calculations
easier.
(i) 117² (ii) 78² (iii) 198²
(iv) 214² (v) 1104² (vi) 1120²

(i) $117^2$

Now, using identity

$(a+b)^2 = a^2 + 2ab + b^2$

We have,

$117 = 100 + 17$

So,

$a = 100,\ b = 17$

$117^2 = (100 + 17)^2$

$= (100)^2 + 2 \times 100 \times 17 + (17)^2$ ( Using , $(a+b)^2 = a^2 + 2ab + b^2$ )

$= 10000 + 3400 + 289$

$= 13689$

Hence,

$117^2 = 13689$ Ans

(ii) $78^2$

Now, using identity

$(a – b)^2 = a^2 – 2ab + b^2$

We have,

$78 = 80 – 2$

So,

$a = 80,\ b = 2$

$78^2 = (80 – 2)^2$

$= (80)^2 – 2 \times 80 \times 2 + (2)^2$ ( Using , $(a+b)^2 = a^2 + 2ab + b^2$ )

$= 6400 – 320 + 4$

$= 6084$

Hence,

$78^2 = 6084$ Ans

(iii) $198^2$

Now, using identity

$(a – b)^2 = a^2 – 2ab + b^2$

We have,

$198 = 200 – 2$

So,

$a = 200,\ b = 2$

$198^2 = (200 – 2)^2$

$= (200)^2 – 2 \times 200 \times 2 + (2)^2$ (Using $(a – b)^2 = a^2 – 2ab + b^2$ )

$= 40000 – 800 + 4$

$= 39204$

Hence,

$198^2 = 39204$ Ans

(iv) $214^2$

Now, using identity

$(a + b)^2 = a^2 + 2ab + b^2$

We have,

$214 = 200 + 14$

So,

$a = 200,\ b = 14$

$214^2 = (200 + 14)^2$

$= (200)^2 + 2 \times 200 \times 14 + (14)^2$ (Using $(a - b)^{2} = a^{2} - 2 a b + b^{2}$ )

$= 40000 + 5600 + 196$

$= 45796$

Hence,

$214^2 = 45796$ Ans

(v) $1104^2$

Now, using identity

$(a + b)^2 = a^2 + 2ab + b^2$

We have,

$1104 = 1100 + 4$

So,

$a = 1100,\ b = 4$

$1104^2 = (1100 + 4)^2$

$= (1100)^2 + 2 \times 1100 \times 4 + (4)^2$ ( $(a + b)^2 = a^2 + 2ab + b^2$ )

$= 1210000 + 8800 + 16$

$= 1218816$

Hence,

$1104^2 = 1218816$ Ans

(vi) $1120^2$

Now, using identity

$(a + b)^2 = a^2 + 2ab + b^2$

We have,

$1120 = 1100 + 20$

So,

$a = 1100,\ b = 20$

$1120^2 = (1100 + 20)^2$

$= (1100)^2 + 2 \times 1100 \times 20 + (20)^2$

$= 1210000 + 44000 + 400$

$= 1254400$

Hence,

$1120^2 = 1254400$ Ans

Q2. Factor using suitable identities

(i) $16y^2 – 24y + 9$

Now, using identity

$(a – b)^2 = a^2 – 2ab + b^2$

We have,

$16y^2 = (4y)^2$

$9 = (3)^2$

$= (4y)^2 – 2 \times 4y \times 3 + (3)^2$

So,
$a = 4y,\ b = 3$

Hence,

$16y^2 – 24y + 9 = (4y – 3)^2$ Ans

(ii) $\frac{9}{4}s^2 + 6st + 4t^2$

Now, using identity

$(a + b)^2 = a^2 + 2ab + b^2$

We have,

$\frac{9}{4}s^2 = \left(\frac{3}{2}s\right)^2$

$4t^2 = (2t)^2$

$= \left(\frac{3}{2}s\right)^2 + 2 \times \frac{3}{2}s \times 2t + (2t)^2$

So,

$a = \frac{3}{2}s,\ b = 2t$

Hence,

$\frac{9}{4}s^2 + 6st + 4t^2 = \left(\frac{3}{2}s + 2t\right)^2$ Ans

(iii) $m^2 + mk + k^2 + 3nk + 2mn + 9n^2$

Now, using identity

$(a + b + c)^2 = a^2 + b^2 + c^2 + 2ab + 2bc + 2ca$

We have,

$a = m,\ b = k,\ c = 3n$

Hence,

$= (m + k + 3n)^2$ Ans

(iv) $\frac{p^2}{16} – 2 + \frac{16}{p^2}$

Now, using identity

$(a – b)^2 = a^2 – 2ab + b^2$

We have,

$\frac{p^2}{16} = \left(\frac{p}{4}\right)^2$

$\frac{16}{p^2} = \left(\frac{4}{p}\right)^2$

$= \left(\frac{p}{4}\right)^2 – 2 \times \frac{p}{4} \times \frac{4}{p} + \left(\frac{4}{p}\right)^2$

So,
$a = \frac{p}{4},\ b = \frac{4}{p}$

Hence,

$\frac{p^2}{16} – 2 + \frac{16}{p^2} = \left(\frac{p}{4} – \frac{4}{p}\right)^2$

(v) $9a^2 + 4b^2 + c^2 – 12ab + 6ac – 4bc$

Now, using identity

$(a + b + c)^2 = a^2 + b^2 + c^2 + 2ab + 2bc + 2ca$

We have,

$= (3a)^2 + (2b)^2 + c^2 – 2 \times 3a \times 2b + 2 \times 3a \times c – 2 \times 2b \times c$

So,
$a = 3a,\ b = -2b,\ c = c$

Hence,

$= (3a – 2b + c)^2$ Ans

Q3. Expand the following using the identity

(a + b + c)² = a² + b²+ c² + 2ab + 2bc + 2ca

(i) $(p + 3q + 7r)^2$

(ii) $(3 x - 2 y + 4 z)^{2}$

(i) $(p + 3q + 7r)^2$

Now, using identity

$(a + b + c)^2 = a^2 + b^2 + c^2 + 2ab + 2bc + 2ca$

We have,

$= p^2 + 9q^2 + 49r^2 + 6pq + 42qr + 14pr$ Ans

(ii) $(3x – 2y + 4z)^2$

Now, using identity

$(a + b + c)^2 = a^2 + b^2 + c^2 + 2ab + 2bc + 2ca$ (a+b+c)

We have,

$= 9x^2 + 4y^2 + 16z^2 – 12xy – 16yz + 24xz$ Ans

Q4. Is this an identity?

$(a + b – c)^2 + (a – b + c)^2$

Expand:

$= a^2 + b^2 + c^2 + 2ab – 2ac – 2bc$

$+ a^2 + b^2 + c^2 – 2ab + 2ac – 2bc$

$= 2a^2 + 2b^2 + 2c^2 – 4bc$

Right side:

$2a^2 + 2b^2 + 2c^2$

Not equal

Hence, not an identity

Ans: Not an identity

Exercise Set 4.4

Fill in the blanks to complete the following identities:
(i) s² – 11s + 24 = (________) (________)
(ii) (________) (x + 1) = (3x² – 4x –7)
(iii) 10x²– 11x – 6 = (2x ________) ( + 2)
(iv) 6x²+ 7x + 2 = (__________) (_________)

Solution:

(i) $s^2 – 11s + 24$

Now, using identity $(x + a)(x + b) = x^2 + (a + b)x + ab$

We have,

$a + b = -11,\quad ab = 24$

Numbers are: $-3$ and $-8$

Hence, $s^2 – 11s + 24 = (s – 3)(s – 8)$

Ans: $(s – 3)(s – 8)$

(ii) $(\_\_\_)(x + 1) = 3x^2 – 4x – 7$ (___)

Now, using identity $(x + a)(x + b) = x^2 + (a + b)x + ab$

We factor RHS: $3x^2 – 4x – 7$

Split middle term: $= 3x^2 – 7x + 3x – 7$ $= (3x^2 – 7x) + (3x – 7)$ $= x(3x – 7) + 1(3x – 7)$ $= (x + 1)(3x – 7)$

Hence, $(\_\_\_)(x + 1) = (3x – 7)(x + 1)$

Ans: $3x – 7$

(iii) $10x^2 – 11x – 6 = (2x – \_\_)(\_\_ + 2)$

Now, using identity $(x + a)(x + b) = x^2 + (a + b)x + ab$

We factor: $10x^2 – 11x – 6$

Split middle term: $= 10x^2 – 15x + 4x – 6$ $= (10x^2 – 15x) + (4x – 6)$ $= 5x(2x – 3) + 2(2x – 3)$ $= (5x + 2)(2x – 3)$

Hence, $= (2x – 3)(5x + 2)$

Ans: $3,\ 5x$

(iv) $6x^2 + 7x + 2 = (\_\_)(\_\_)$

Now, using identity $(x + a)(x + b) = x^2 + (a + b)x + ab$

We factor: $6x^2 + 7x + 2$

Split middle term: $= 6x^2 + 3x + 4x + 2$ $= (6x^2 + 3x) + (4x + 2)$ $= 3x(2x + 1) + 2(2x + 1)$ $= (3x + 2)(2x + 1)$

Ans: $(3x + 2)(2x + 1)$

2. Select and use the identity that will help you to find the following
products without multiplying directly:

(i) (41)² (ii) (27)²
(iii) (23 × 17) (iv) (135)²
(v) (97)² (vi) (18 × 29)
(vii) (34 × 43) (viii) (205)²

Solutions :

(i) $41^2$

Now, using identity $(a + b)^2 = a^2 + 2ab + b^2$

We have,

$41 = 40 + 1$ $41^2 = (40 + 1)^2 = 40^2 + 2 \times 40 \times 1 + 1^2$ $= 1600 + 80 + 1 = 1681$

Ans: 1681

(ii) $27^2$

Now, using identity $(a – b)^2 = a^2 – 2ab + b^2$

We have,

$27 = 30 – 3$ $27^2 = (30 – 3)^2 = 900 – 180 + 9 = 729$

Ans: 729

(iii) $23 \times 17$

Now, using identity $(a + b)(a – b) = a^2 – b^2$

We have,

$23 = 20 + 3,\quad 17 = 20 – 3$
$23 \times 17 = (20 + 3)(20 – 3) = 20^2 – 3^2 = 400 – 9 = 391$

Ans: 391

(iv) $135^2$

Now, using identity $(a + b)^2 = a^2 + 2ab + b^2$

We have,

$135 = 100 + 35$ $135^2 = 100^2 + 2 \times 100 \times 35 + 35^2$ $= 10000 + 7000 + 1225 = 18225$

Ans: 18225

(i) $9a^2 + b^2 + 4c^2 – 6ab + 12ac – 4bc$

Now, using identity $(a + b + c)^2 = a^2 + b^2 + c^2 + 2ab + 2bc + 2ca$

We write: $= (3a)^2 + b^2 + (2c)^2 – 2(3a)(b) + 2(3a)(2c) – 2(b)(2c)$

So,

$a = 3a,\ b = -b,\ c = 2c$

Hence, $= (3a – b + 2c)^2$

Ans: $(3a – b + 2c)^2$

(ii) $16s^2 + 25t^2 – 40st$

Now, using identity $(a – b)^2 = a^2 – 2ab + b^2$

We have, $16s^2 = (4s)^2,\quad 25t^2 = (5t)^2$ $= (4s)^2 – 2(4s)(5t) + (5t)^2$

Hence, $= (4s – 5t)^2$

Ans: $(4s – 5t)^2$

(iii) $r^2 – r – 42$

Now, using identity $(x + a)(x + b) = x^2 + (a + b)x + ab$

We have,

$a + b = -1,\quad ab = -42$

Numbers are: $6$ and $-7$

Hence, $r^2 – r – 42 = (r + 6)(r – 7)$

Ans: $(r + 6)(r – 7)$

Exercise Set 4.5

1. Simplify the following rational expressions, assuming that the expressions in the denominators are not equal to zero:

(i) \frac{3p^2 – 3pq – 18q^2}{p^2 + 3pq – 10q^2}

(ii) \frac{n^3 – 3n^2m + 3nm^2 – m^3}{5m^2 – 10mn + 5n^2}

(iii) \frac{w^3 – v^3 + x^3 + 3wvx}{w^2 + v^2 + x^2 – 2wv – 2vx + 2wx}

(iv) \frac{4y^2 – 20yz + 25z^2}{(25z^2 – 4y^2)}

(v) \frac{(x^2 + x – 6)(x^2 – 7x + 12)}{(x^2 – 6x + 8)(x^2 – 9)}

(vi) \frac{p^4 – 16}{p^2 – 4p + 4}

Solution:

(i) $\dfrac{3p^2 – 3pq – 18q^2}{p^2 + pq – 10q^2}$

Now, using identity $(x + a)(x + b) = x^2 + (a + b)x + ab$

We factor numerator: $3p^2 – 3pq – 18q^2 = 3(p^2 – pq – 6q^2)$ $= 3(p^2 – 3pq + 2pq – 6q^2)$ $= 3[(p^2 – 3pq) + (2pq – 6q^2)]$ $= 3[p(p – 3q) + 2q(p – 3q)]$ $= 3(p – 3q)(p + 2q)$

Denominator: $p^2 + pq – 10q^2 = (p + 5q)(p – 2q)$

Hence, $\dfrac{3(p – 3q)(p + 2q)}{(p + 5q)(p – 2q)}$

Ans: $\dfrac{3(p – 3q)(p + 2q)}{(p + 5q)(p – 2q)}$

(ii) $\dfrac{n^3 – 5n^2m + 3nm^2 – m^3}{5m^2 – 10mn + 5n^2}$

Now, using identity $(a – b)^3 = a^3 – 3a^2b + 3ab^2 – b^3$

We factor numerator: $= (n – m)^3$

Denominator: $5m^2 – 10mn + 5n^2 = 5(m – n)^2$ $= 5(n – m)^2$

Hence, $\dfrac{(n – m)^3}{5(n – m)^2} = \dfrac{n – m}{5}$

Ans: $\dfrac{n – m}{5}$

(iii) $\dfrac{w^3 – v^3 + x^3 – wvx}{w^2 + v^2 + x^2 – wv – vx – wx}$

Now, using identity $a^3 + b^3 + c^3 – 3abc = (a + b + c)(a^2 + b^2 + c^2 – ab – bc – ca)$

We rewrite numerator: $= w^3 + v^3 + x^3 – 3wvx$ $= (w + v + x)(w^2 + v^2 + x^2 – wv – vx – wx)$

Hence, $\dfrac{(w + v + x)(w^2 + v^2 + x^2 – wv – vx – wx)}{w^2 + v^2 + x^2 – wv – vx – wx}$

$= w + v + x$

Ans: $w + v + x$

(iv) $\dfrac{4y^2 – 20yz + 25z^2}{(2z^2 – 4y^2)}$

Now, using identity $(a – b)^2 = a^2 – 2ab + b^2$

Numerator: $= (2y – 5z)^2$

Denominator: $2z^2 – 4y^2 = 2(z^2 – 2y^2)$ $= 2(z – \sqrt{2}y)(z + \sqrt{2}y)$

Ans: $\dfrac{(2y – 5z)^2}{2(z^2 – 2y^2)}$ 2

(v) $\dfrac{(x^2 + x – 6)(x^2 – 7x + 12)}{(x^2 – 6x + 8)(x^2 – 9)}$

Now, using identity

(x+a)(x+b) = x^2 + (a+b)x + ab

We factor: $x^2 + x – 6 = (x + 3)(x – 2)$ $x^2 – 7x + 12 = (x – 3)(x – 4)$ $x^2 – 6x + 8 = (x – 2)(x – 4)$ $x^2 – 9 = (x – 3)(x + 3)$

Hence, $\dfrac{(x + 3)(x – 2)(x – 3)(x – 4)}{(x – 2)(x – 4)(x – 3)(x + 3)}$

Cancel common terms: $= 1$

Ans: $1$

(vi) $\dfrac{p^4 – 16}{p^2 – 4p + 4}$

Now, using identity $a^2 – b^2 = (a + b)(a – b)$ $p^4 – 16 = (p^2)^2 – 4^2 = (p^2 – 4)(p^2 + 4)$ $= (p – 2)(p + 2)(p^2 + 4)$

Denominator: $p^2 – 4p + 4 = (p – 2)^2$

Hence, $\dfrac{(p – 2)(p + 2)(p^2 + 4)}{(p – 2)^2}$ $= \dfrac{(p + 2)(p^2 + 4)}{p – 2}$

Ans: $\dfrac{(p + 2)(p^2 + 4)}{p – 2}$

End-of-Chapter Exercises

1. Use suitable identities to find the following products:

\begin{matrix} \text{(i) } (-3x + 4)^2 & \text{(ii) } (2s + 7)(2s – 7) \\ \\ \text{(iii) } (p^2 + \frac{1}{2})(p^2 – \frac{1}{2}) & \text{(iv) } (2n + 7)(2n – 7) \\ \\ \text{(v) } (s – 2t)(s^2 + 2st + 4t^2) & \text{(vi) } (\frac{1}{2r} – 4r)^2 \\ \\ \text{(vii) } (-3m + 4k – l)^2 & \text{(viii) } (x – \frac{1}{3}y)^3 \\ \\ \text{(ix) } (\frac{7}{2}k – \frac{2}{3}m)^3 & \end{matrix}

(i) $(-3x + 4)^2$

Now, using identity

$(a+b)^2 = a^2 + 2ab + b^2$

We have,

$a = -3x,\ b = 4$ $(-3x + 4)^2 = (-3x)^2 + 2(-3x)(4) + 4^2$ $= 9x^2 – 24x + 16$

Hence, $(-3x + 4)^2 = 9x^2 – 24x + 16 \ \text{Ans}$

(ii) $(2s + 7)(2s – 7)$

Now, using identity $(a + b)(a – b) = a^2 – b^2$

We have,

$a = 2s,\ b = 7$ $= (2s)^2 – 7^2 = 4s^2 – 49$

Hence, $(2s + 7)(2s – 7) = 4s^2 – 49 \ \text{Ans}$

(iii) $\left(p^2 + \frac{1}{2}\right)\left(p^2 – \frac{1}{2}\right)$

Now, using identity $(a + b)(a – b) = a^2 – b^2$

We have,

$a = p^2,\ b = \frac{1}{2}$ $= (p^2)^2 – \left(\frac{1}{2}\right)^2$ $= p^4 – \frac{1}{4}$

Hence, $= p^4 – \frac{1}{4} \ \text{Ans}$

(iv) $(2n + 7)(2n – 7)$

Now, using identity $(a + b)(a – b) = a^2 – b^2$

We have,

$a = 2n,\ b = 7$ $= (2n)^2 – 7^2 = 4n^2 – 49$

Hence, $= 4n^2 – 49 \ \text{Ans}$

(v) $(s – 2t)(s^2 + 2st + 4t^2)$

Now, using identity $(a – b)(a^2 + ab + b^2) = a^3 – b^3$

We have,

$a = s,\ b = 2t$ $= s^3 – (2t)^3 = s^3 – 8t^3$

Hence, $= s^3 – 8t^3 \ \text{Ans}$

(vi) $\left(\frac{1}{2r} – 4r\right)^2$

Now, using identity $(a – b)^2 = a^2 – 2ab + b^2$

We have,

$a = \frac{1}{2r},\ b = 4r$ $= \left(\frac{1}{2r}\right)^2 – 2\left(\frac{1}{2r}\right)(4r) + (4r)^2$ $= \frac{1}{4r^2} – 4 + 16r^2$

Hence, $= 16r^2 – 4 + \frac{1}{4r^2} \ \text{Ans}$

(vii) $(-3m + 4k – l)^2$

Now, using identity $(a + b + c)^2 = a^2 + b^2 + c^2 + 2ab + 2bc + 2ca$

We have,

$a = -3m,\ b = 4k,\ c = -l$
$= (-3m)^2 + (4k)^2 + (-l)^2 + 2(-3m)(4k) + 2(4k)(-l) + 2(-3m)(-l)$ $= 9m^2 + 16k^2 + l^2 – 24mk – 8kl + 6ml$

Hence, $= 9m^2 + 16k^2 + l^2 – 24mk – 8kl + 6ml \ \text{Ans}$

(viii) $\left(x – \frac{1}{3}y\right)^3$

Now, using identity $(a – b)^3 = a^3 – 3a^2b + 3ab^2 – b^3$

We have,

$a = x,\ b = \frac{1}{3}y$ $= x^3 – 3x^2\left(\frac{1}{3}y\right) + 3x\left(\frac{1}{3}y\right)^2 – \left(\frac{1}{3}y\right)^3$ $= x^3 – x^2y + \frac{1}{3}xy^2 – \frac{1}{27}y^3$

Hence, $= x^3 – x^2y + \frac{1}{3}xy^2 – \frac{1}{27}y^3 \ \text{Ans}$

(ix) $\left(\frac{7}{2}k – \frac{2}{3}m\right)^3$

Now, using identity $(a – b)^3 = a^3 – 3a^2b + 3ab^2 – b^3$

We have,

$a = \frac{7}{2}k,\ b = \frac{2}{3}m$ $= \left(\frac{7}{2}k\right)^3 – 3\left(\frac{7}{2}k\right)^2\left(\frac{2}{3}m\right) + 3\left(\frac{7}{2}k\right)\left(\frac{2}{3}m\right)^2 – \left(\frac{2}{3}m\right)^3$

$= \frac{343}{8}k^3 – \frac{49}{2}k^2m + \frac{14}{3}km^2 – \frac{8}{27}m^3$

Hence, $= \frac{343}{8}k^3 – \frac{49}{2}k^2m + \frac{14}{3}km^2 – \frac{8}{27}m^3 \ \text{Ans}$

Find the values using suitable identities:
(i) 17 × 21 (ii) 104 × 96
(iii) 24 × 16 (iv) 147³
(v) 199³ (vi) 127³
(vii) (–107)³ (viii) (–299)³

Solution:

(i) $17 \times 21$

Using identity

$(a+b)(a-b)=a^2-b^2$

We have,

$17 \times 21 = (19 – 2)(19 + 2)$
$= 19^2 – 2^2$ $= 361 – 4$
$= 357$

357 Ans

(ii) $104 \times 96$

Using identity

$(a+b)(a-b)=a^2-b^2$

We have,

$104 \times 96 = (100 + 4)(100 – 4)$ $= 100^2 – 4^2$ $= 10000 – 16$ $= 9984$

Ans: 9984

(iii) $24 \times 16$

Using identity $(a+b)(a-b)=a^2-b^2$

We have,

$24 \times 16 = (20 + 4)(20 – 4)$ $= 20^2 – 4^2$ $= 400 – 16$ $= 384$

Ans: 384

(iv) $147^3$

Using identity

$(a-b)^3=a^3-3a^2b+3ab^2-b^3$

We have,

$147 = 150 – 3$ $(150 – 3)^3$ $= 150^3 – 3 \cdot 150^2 \cdot 3 + 3 \cdot 150 \cdot 3^2 – 3^3$ $= 3375000 – 202500 + 4050 – 27$ $= 3176523$

Ans: 3176523

(v) $199^3$

Using identity $(a-b)^3=a^3-3a^2b+3ab^2-b^3$

We have,

$199 = 200 – 1$ $(200 – 1)^3$ $= 200^3 – 3 \cdot 200^2 + 3 \cdot 200 – 1$ $= 8000000 – 120000 + 600 – 1$ $= 7880599$

Ans: 7880599

(vi) $127^3$

Using identity

$(a+b)^3=a^3+3a^2b+3ab^2+b^3$

We have,

$127 = 100 + 27$ $(100 + 27)^3$ $= 100^3 + 3 \cdot 100^2 \cdot 27 + 3 \cdot 100 \cdot 27^2 + 27^3$ $= 1000000 + 810000 + 218700 + 19683$ $= 2048383$

Ans: 2048383

(vii) $(-107)^3$

Using identity $(-a)^3 = -a^3$

We have, $(-107)^3 = -(107^3)$ $107 = 100 + 7$ $= -(100 + 7)^3$ $= -(1000000 + 210000 + 14700 + 343)$ $= -1225043$

Ans: $-1225043$

(viii) $(-299)^3$

Using identity $(a-b)^3=a^3-3a^2b+3ab^2-b^3$

We have, $299 = 300 – 1$ $(-299)^3 = -(300 – 1)^3$ $= -(300^3 – 3 \cdot 300^2 + 3 \cdot 300 – 1)$ $= -(27000000 – 270000 + 900 – 1)$ $= -26730899$

Ans: $-26730899$

Q3. Factor the following algebraic expressions:

Solutions:

(i) $4y^2 + 1 + \frac{1}{16y^2}$

Using identity

$a^2+2ab+b^2=(a+b)^2$

We have, $4y^2 = (2y)^2$ $\frac{1}{16y^2} = \left(\frac{1}{4y}\right)^2$ $1 = 2(2y)\left(\frac{1}{4y}\right)$

Hence, $4y^2 + 1 + \frac{1}{16y^2} = (2y + \frac{1}{4y})^2$

Ans: $(2y + \frac{1}{4y})^2$

(ii) $9m^2 – \frac{1}{25n^2}$

Using identity $a^2 – b^2 = (a-b)(a+b)$ $9m^2 = (3m)^2$ $\frac{1}{25n^2} = \left(\frac{1}{5n}\right)^2$

Hence, $= (3m – \frac{1}{5n})(3m + \frac{1}{5n})$

Ans: $(3m – \frac{1}{5n})(3m + \frac{1}{5n})$

(iii) $27b^3 – \frac{1}{64b^3}$

Using identity $a^3 – b^3 = (a-b)(a^2 + ab + b^2)$ $27b^3 = (3b)^3$ $\frac{1}{64b^3} = \left(\frac{1}{4b}\right)^3$

Hence, $= (3b – \frac{1}{4b})(9b^2 + \frac{3}{4} + \frac{1}{16b^2})$

(iv) $x^2 + \frac{5x}{6} + \frac{1}{6}$

Using identity $x^2 + (a+b)x + ab = (x+a)(x+b)$

We have, $a+b = \frac{5}{6}, \quad ab = \frac{1}{6}$

Numbers: $\frac{1}{2}, \frac{1}{3}$

Hence, $= (x + \frac{1}{2})(x + \frac{1}{3})$

(v) $27u^3 – \frac{1}{125} – \frac{27u^2}{5} + \frac{9u}{25}$

Using identity,

$(a-b)^3=a^3-3a^2b+3ab^2-b^3$ $27u^3 = (3u)^3$ $\frac{1}{125} = \left(\frac{1}{5}\right)^3$

Hence, $= (3u – \frac{1}{5})^3$

(vi) $64y^3 + \frac{1}{125}z^3$

Using identity $a^3 + b^3 = (a+b)(a^2 – ab + b^2)$ $64y^3 = (4y)^3$ $\frac{1}{125}z^3 = \left(\frac{z}{5}\right)^3$

Hence, $= (4y + \frac{z}{5})(16y^2 – \frac{4yz}{5} + \frac{z^2}{25})$

(vii) $p^3 + 27q^3 + r^3 – 9pqr$

Using identity $a^3+b^3+c^3-3abc=(a+b+c)(a^2+b^2+c^2-ab-bc-ca)$ $a=p,\ b=3q,\ c=r$

Hence, $= (p+3q+r)(p^2+9q^2+r^2-3pq-3qr-pr)$

(viii) $9m^2 – 12m + 4$

Using identity $a^2 – 2ab + b^2 = (a-b)^2$ $9m^2 = (3m)^2,\quad 4 = 2^2$

Hence, $= (3m – 2)^2$

(ix)

$9x^3 – \frac{8}{3}y^3 + \frac{z^3}{3} + 6xyz$

Using identity

$a^3+b^3+c^3-3abc=(a+b+c)(a^2+b^2+c^2-ab-bc-ca)$

We match: $9x^3 = (3x)^3$ $-\frac{8}{3}y^3 = \left(-\frac{2}{3}y\right)^3$ $\frac{z^3}{3} = \left(\frac{z}{3}\right)^3$

So, $a = 3x,\quad b = -\frac{2}{3}y,\quad c = \frac{z}{3}$

Check middle term: $-3abc = -3 \cdot 3x \cdot \left(-\frac{2}{3}y\right) \cdot \frac{z}{3} = 6xyz$

Hence, $= (3x – \frac{2}{3}y + \frac{z}{3})^3$

Ans: $(3x – \frac{2}{3}y + \frac{z}{3})^3$

(x)

$4x^2 + 9y^2 + 36z^2 + 12xz + 36yz + 24xy$

Using identity

$(a+b+c)^2=a^2+b^2+c^2+2ab+2bc+2ca$

We match: $4x^2 = (2x)^2$ $9y^2 = (3y)^2$ $36z^2 = (6z)^2$

So, $a = 2x,\quad b = 3y,\quad c = 6z$

Check middle terms: $2ab = 2(2x)(3y) = 12xy$ $2bc = 2(3y)(6z) = 36yz$ $2ca = 2(2x)(6z) = 24xz$

All terms match.

Hence, $= (2x + 3y + 6z)^2$

Ans: $(2x + 3y + 6z)^2$

(xi)

$27u^3 – \frac{1}{216} – \frac{9u^2}{2} + \frac{u}{4}$

Using identity

$(a-b)^3=a^3-3a^2b+3ab^2-b^3$

We match: $27u^3 = (3u)^3$ $\frac{1}{216} = \left(\frac{1}{6}\right)^3$

So, $a = 3u,\quad b = \frac{1}{6}$

Now check middle terms: $-3a^2b = -3(3u)^2\left(\frac{1}{6}\right) = -3 \cdot 9u^2 \cdot \frac{1}{6} = -\frac{27u^2}{6} = -\frac{9u^2}{2}$ $3ab^2 = 3(3u)\left(\frac{1}{6}\right)^2 = 3 \cdot 3u \cdot \frac{1}{36} = \frac{9u}{36} = \frac{u}{4}$

All terms match.

Hence, $= (3u – \frac{1}{6})^3$

Ans: $(3u – \frac{1}{6})^3$

Q4. Simplify the following

(i)

$\frac{4x^2 + 4x + 1}{4x^2 – 1}$

Step 1: Factor the numerator

Using identity

$a^2+2ab+b^2=(a+b)^2$ $4x^2 + 4x + 1 = (2x)^2 + 2(2x)(1) + 1^2$ $= (2x + 1)^2$

Step 2: Factor the denominator

Using identity

$a^2-b^2=(a-b)(a+b)$

$= (2x – 1)(2x + 1)$

Step 3: Simplify

$\frac{(2x + 1)^2}{(2x – 1)(2x + 1)}$

Cancel common factor $(2x+1)$ $= \frac{2x + 1}{2x – 1}$

Ans: $\frac{2x + 1}{2x – 1}$

(ii)

$\frac{9(3a^3 – 24b^3)}{9a^2 – 36b^2}$

Step 1: Factor the numerator

$9(3a^3 – 24b^3) = 9 \cdot 3(a^3 – 8b^3)$ $= 27(a^3 – (2b)^3)$

Using identity

$a^3-b^3=(a-b)(a^2+ab+b^2)$ $= 27(a – 2b)(a^2 + 2ab + 4b^2)$

Step 2: Factor the denominator

$9a^2 – 36b^2 = 9(a^2 – 4b^2)$

Using identity $a^2-b^2=(a-b)(a+b)$ $= 9(a – 2b)(a + 2b)$

Step 3: Simplify

$\frac{27(a – 2b)(a^2 + 2ab + 4b^2)}{9(a – 2b)(a + 2b)}$

Cancel common factors:

$a – 2b$
$27/9 = 3$

$= \frac{3(a^2 + 2ab + 4b^2)}{a + 2b}$

Ans: $\frac{3(a^2 + 2ab + 4b^2)}{a + 2b}$

(iii)

$\frac{s^3 + 125t^3}{s^2 – 2st – 35t^2}$

Step 1: Factor the numerator

$s^3 + 125t^3 = s^3 + (5t)^3$

Using identity

$a^3+b^3=(a+b)(a^2-ab+b^2)$ $= (s + 5t)(s^2 – 5st + 25t^2)$

Step 2: Factor the denominator

$s^2 – 2st – 35t^2$

Split middle term: $= s^2 – 7st + 5st – 35t^2$ $= s(s – 7t) + 5t(s – 7t)$ $= (s + 5t)(s – 7t)$

Step 3: Simplify

$\frac{(s + 5t)(s^2 – 5st + 25t^2)}{(s + 5t)(s – 7t)}$

Cancel common factor $(s+5t)$ $= \frac{s^2 – 5st + 25t^2}{s – 7t}$

Ans: $\frac{s^2 – 5st + 25t^2}{s – 7t}$

Find possible expressions for the length and breadth of each of
The following rectangles whose areas are given by the following
expressions in square units.
(i) 25a² – 30ab + 9b² (ii) 36s²– 49t²

Solutions:

(i) $25a^2 – 30ab + 9b^2$

Step 1: Identify identity

$a^2-2ab+b^2=(a-b)^2$

Step 2: Match terms

$25a^2 = (5a)^2$ $9b^2 = (3b)^2$

Check middle term:

Step 3: Factorise

$25a^2 – 30ab + 9b^2 = (5a – 3b)^2$

Area = Length × Breadth $= (5a – 3b)(5a – 3b)$

Ans:
Length = $5a – 3b$ 5a−3b
Breadth = $5a – 3b$ 5a−3b

(ii) $36s^2 – 49t^2$

Step 1: Identify identity

$a^2 – b^2 = (a-b)(a+b)$

Step 2: Match terms

$36s^2 = (6s)^2$ $49t^2 = (7t)^2$

Step 3: Factorise

$36s^2 – 49t^2 = (6s – 7t)(6s + 7t)$

Area = Length × Breadth

Ans:
Length = $6s – 7t$
Breadth = $6s + 7t$

Find possible expressions for the length, breadth, and height of
each of the following cuboids whose volumes are given by the
following expressions in cubic units.
(i) 6a²– 24b² (ii) 3ps²– 15ps + 12p

Solutions:

(i) $6a^2 – 24b^2$ 6a2−24b2

Step 1: Take the common factor

$= 6(a^2 – 4b^2)$

Step 2: Identify identity

$a^2 – b^2 = (a-b)(a+b)$

Step 3: Apply identity

$a^2 – 4b^2 = (a – 2b)(a + 2b)$

Step 4: Combine

$6a^2 – 24b^2 = 6(a – 2b)(a + 2b)$

Step 5: Express as a product of 3 factors

$6 = 2 \times 3$ $= 2 \times 3 \times (a – 2b)(a + 2b)$

Step 6: Interpret as dimensions

Volume = length × breadth × height

Ans:
Length = 2
Breadth = 3
Height = $(a – 2b)(a + 2b)$

(ii) $3ps^2 – 15ps + 12p$

Step 1: Take the common factor

$= 3p(s^2 – 5s + 4)$

Step 2: Factor the quadratic

Using identity $x^2 – (a+b)x + ab = (x-a)(x-b)$

We need numbers whose: $a+b = 5,\quad ab = 4$

Numbers: 1 and 4

Step 3: Factorise

$s^2 – 5s + 4 = (s – 1)(s – 4)$

Step 4: Combine

$3ps^2 – 15ps + 12p = 3p(s – 1)(s – 4)$

Volume = product of 3 dimensions

Ans:
Length = $3p$
Breadth = $(s – 1)$
Height = $(s – 4)$

The village playground is shaped as a square of side 40 metres.
A path of width s metres is created around the playground for
people to walk. Find an expression for the area of the path in
terms of s.

Solution:

Side of playground = $40$
Width of path = $s$

Step 1: Outer side

$= 40 + 2s$

Step 2: Use identity

$(a+b)^2 = a^2 + 2ab + b^2$

Step 3: Area of path

$= (40 + 2s)^2 – 40^2$ $= (1600 + 160s + 4s^2) – 1600$ $= 4s^2 + 160s$

Ans: $4s^2 + 160s$

If a number plus its reciprocal equals 10/3, find the number.

Solution:

Given, $x + \frac{1}{x} = \frac{10}{3}$

Step 1: Multiply by $x$

$x^2 + 1 = \frac{10}{3}x$

Bring to one side

$x^2 – \frac{10}{3}x + 1 = 0$

Multiply by 3: $3x^2 – 10x + 3 = 0$

Factorise

$3x^2 – 10x + 3 = 3x^2 – 9x – x + 3$ $= 3x(x – 3) -1(x – 3)$ $= (3x – 1)(x – 3)$

Solve by equating to zero

$3x – 1 = 0 \Rightarrow x = \frac{1}{3}$ $x – 3 = 0 \Rightarrow x = 3$

Final Answer

$x = 3 \quad \text{or} \quad \frac{1}{3}$

A rectangular pool has an area 2x² + 7x + 3 square hastas. If its width
is 2x + 1 hastas, find its length. Hasta was a unit used to measure
length.

Solution :

Given,
Area $= 2x^2 + 7x + 3$
Width $= 2x + 1$

Use the formula

$\text{Area} = \text{Length} \times \text{Width}$ $\text{Length} = \frac{\text{Area}}{\text{Width}}$

Substitute

$\text{Length} = \frac{2x^2 + 7x + 3}{2x + 1}$ Factor the numerator

$2x^2 + 7x + 3 = 2x^2 + 6x + x + 3$ $= 2x(x + 3) + 1(x + 3)$ $= (2x + 1)(x + 3)$

Simplify

$\text{Length} = \frac{(2x + 1)(x + 3)}{2x + 1}$ $= x + 3$

Final Answer

$\text{Length} = x + 3 \text{ hastas}$

If both x – 2 and x – 1/2 are factors of px² + 5x + r, show that p = r.

Given:

$(x – 2)$ (x−2) and $(x – \tfrac{1}{2})$ $px^2 + 5x + r$

Use Factor Theorem

If $(x – a)$ (x−a) is a factor, then $f(a) = 0$

Put $x = 2$

$p(2)^2 + 5(2) + r = 0$ $4p + 10 + r = 0 \quad \text{(1)}$

Put $x = \tfrac{1}{2}$

$p\left(\tfrac{1}{2}\right)^2 + 5\left(\tfrac{1}{2}\right) + r = 0$ $\frac{p}{4} + \frac{5}{2} + r = 0 \quad \text{(2)}$

Multiply (2) by 4

$p + 10 + 4r = 0 \quad \text{(3)}$

Solve (1) and (3)

From (1): $4p + r = -10$

From (3): $p + 4r = -10$

Subtract equations

$(4p + r) – (p + 4r) = 0$ $3p – 3r = 0$ $p = r$

Final Result

$p = r$

If a + b + c = 5 and ab + bc + ca = 10, then prove that
a³ + b³ + c³ –3abc = – 25.

Solution: $3a^2 + 4ab + \frac{4}{3}b^2$

Now, using identity $a^2 + 2ab + b^2 = (a + b)^2$

We have, $3a^2 + 4ab + \frac{4}{3}b^2 = \frac{1}{3}(9a^2 + 12ab + 4b^2)$ $= \frac{1}{3}\left[(3a)^2 + 2 \times 3a \times 2b + (2b)^2\right]$

So, $a = 3a,\quad b = 2b$

Hence, $3a^2 + 4ab + \frac{4}{3}b^2 = \frac{1}{3}(3a + 2b)^2 \ \text{Ans}$

12. By factoring the expression, check that $n^{3} - n$ is always divisible by 6 for all natural numbers $n$ . Give reasons.

Solution :

We have $n^{3} - n$

Factor: $n^{3} - n = n (n^{2} - 1) = n (n - 1) (n + 1)$

For any natural number $n$ , $n - 1, n, n + 1$ are three consecutive integers.

At least one of them is even → divisible by 2.
Exactly one of them is divisible by 3.

So the product $(n - 1) n (n + 1)$ is divisible by $2 \times 3 = 6$

Thus, $n^{3} - n$ is always divisible by 6 for all natural numbers $n$ .

13. Find the value of:

(i) $x^{3} + y^{3} - 12 x y + 64$ , when $x + y = - 4$
(ii) $x^{3} - 8 y^{3} - 36 x y - 216$ , when $x = 2 y + 6$

Solutions:

(i) $x^{3} + y^{3} - 12 x y + 64$ , when $x + y = - 4$

Use the identity: $x^{3} + y^{3} = (x + y)^{3} - 3 x y (x + y)$

Substitute $x + y = - 4$ : $x^{3} + y^{3} = (- 4)^{3} - 3 x y (- 4) = - 64 + 12 x y$

Then: $x^{3} + y^{3} - 12 x y + 64 = (- 64 + 12 x y) - 12 x y + 64$ $= - 64 + 12 x y - 12 x y + 64 = 0$

(ii)

$x^3 – 8y^3 – 36xy – 216,\quad \text{when } x = 2y + 6$

Rewrite: $8y^3 = (2y)^3,\quad 216 = 6^3$

So expression becomes: $= x^3 – (2y)^3 – 36xy – 6^3$

Use identity: $a^3 – b^3 = (a-b)(a^2 + ab + b^2)$

Let $x = 2y + 6$

Then, $x – 2y = 6$

So, $x^3 – (2y)^3 = (x-2y)(x^2 + 2xy + 4y^2)$ $= 6(x^2 + 2xy + 4y^2)$

Now expression becomes: $= 6(x^2 + 2xy + 4y^2) – 36xy – 216$

Expand: $= 6x^2 + 12xy + 24y^2 – 36xy – 216$ $= 6x^2 – 24xy + 24y^2 – 216$

Factor: $= 6(x^2 – 4xy + 4y^2 – 36)$ $= 6[(x-2y)^2 – 36]$

Since $x – 2y = 6$ : $= 6(6^2 – 36)$ $= 6(36 – 36) = 0 \ \text{Ans}$

Exercise Set 4.1

Exercise 4.1 – Question 1

Exercise Set 4.2

(i) 9x2+24xy+16y29x^2 + 24xy + 16y^2

(ii) 4s2+20st+25t24s^2 + 20st + 25t^2

(iii) 49x2+28xy+4y249x^2 + 28xy + 4y^2

(iv) 64p2+323pq+49q264p^2 + \frac{32}{3}pq + \frac{4}{9}q^2

(v) 3a2+4ab+43b23a^2 + 4ab + \frac{4}{3}b^2

(vi) 95s2+6sv+5v2\frac{9}{5}s^2 + 6sv + 5v^2

(i) 79279^2

(ii) 1932193^2

(iii) 2992299^2

Exercise Set 4.3

(i) 1172117^2

(ii) 78278^2

(iii) 1982198^2

(iv) 2142214^2

(v) 110421104^2

(vi) 112021120^2

Q2. Factor using suitable identities

(i) 16y2−24y+916y^2 – 24y + 9

(ii) 94s2+6st+4t2\frac{9}{4}s^2 + 6st + 4t^2

(iii) m2+mk+k2+3nk+2mn+9n2m^2 + mk + k^2 + 3nk + 2mn + 9n^2

(iv) p216−2+16p2\frac{p^2}{16} – 2 + \frac{16}{p^2}

(v) 9a2+4b2+c2−12ab+6ac−4bc9a^2 + 4b^2 + c^2 – 12ab + 6ac – 4bc

Q3. Expand the following using the identity

(a + b + c)2 = a2 + b2 + c2 + 2ab + 2bc + 2ca

(i) (p+3q+7r)2(p + 3q + 7r)^2

(ii) (3x−2y+4z)2(3x – 2y + 4z)^2

Q4. Is this an identity?

Exercise Set 4.4

(i) s2−11s+24s^2 – 11s + 24

(ii) (___)(x+1)=3x2−4x−7(\_\_\_)(x + 1) = 3x^2 – 4x – 7(___)

(iii) 10x2−11x−6=(2x−__)(__+2)10x^2 – 11x – 6 = (2x – \_\_)(\_\_ + 2)

(iv) 6x2+7x+2=(__)(__)6x^2 + 7x + 2 = (\_\_)(\_\_)

(i) 41241^2

(ii) 27227^2

(iii) 23×1723 \times 17

(iv) 1352135^2

(i) 9a2+b2+4c2−6ab+12ac−4bc9a^2 + b^2 + 4c^2 – 6ab + 12ac – 4bc

(ii) 16s2+25t2−40st16s^2 + 25t^2 – 40st

(iii) r2−r−42r^2 – r – 42

Exercise Set 4.5

(i) 3p2−3pq−18q2p2+pq−10q2\dfrac{3p^2 – 3pq – 18q^2}{p^2 + pq – 10q^2}

(ii) n3−5n2m+3nm2−m35m2−10mn+5n2\dfrac{n^3 – 5n^2m + 3nm^2 – m^3}{5m^2 – 10mn + 5n^2}

(iii) w3−v3+x3−wvxw2+v2+x2−wv−vx−wx\dfrac{w^3 – v^3 + x^3 – wvx}{w^2 + v^2 + x^2 – wv – vx – wx}

(iv) 4y2−20yz+25z2(2z2−4y2)\dfrac{4y^2 – 20yz + 25z^2}{(2z^2 – 4y^2)}

(v) (x2+x−6)(x2−7x+12)(x2−6x+8)(x2−9)\dfrac{(x^2 + x – 6)(x^2 – 7x + 12)}{(x^2 – 6x + 8)(x^2 – 9)}

(vi) p4−16p2−4p+4\dfrac{p^4 – 16}{p^2 – 4p + 4}

End-of-Chapter Exercises

(i) (−3x+4)2(-3x + 4)^2

(ii) (2s+7)(2s−7)(2s + 7)(2s – 7)

(iii) (p2+12)(p2−12)\left(p^2 + \frac{1}{2}\right)\left(p^2 – \frac{1}{2}\right)

(iv) (2n+7)(2n−7)(2n + 7)(2n – 7)

(v) (s−2t)(s2+2st+4t2)(s – 2t)(s^2 + 2st + 4t^2)

(vi) (12r−4r)2\left(\frac{1}{2r} – 4r\right)^2

(vii) (−3m+4k−l)2(-3m + 4k – l)^2

(viii) (x−13y)3\left(x – \frac{1}{3}y\right)^3

(ix) (72k−23m)3\left(\frac{7}{2}k – \frac{2}{3}m\right)^3

(i) 17×2117 \times 21

(ii) 104×96104 \times 96

(iii) 24×1624 \times 16

(iv) 1473147^3

(v) 1993199^3

(vi) 1273127^3

(vii) (−107)3(-107)^3

(viii) (−299)3(-299)^3

Q3. Factor the following algebraic expressions:

(i) 4y2+1+116y24y^2 + 1 + \frac{1}{16y^2}

(ii) 9m2−125n29m^2 – \frac{1}{25n^2}

(iii) 27b3−164b327b^3 – \frac{1}{64b^3}

(iv) x2+5x6+16x^2 + \frac{5x}{6} + \frac{1}{6}

(v) 27u3−1125−27u25+9u2527u^3 – \frac{1}{125} – \frac{27u^2}{5} + \frac{9u}{25}

(vi) 64y3+1125z364y^3 + \frac{1}{125}z^3

(vii) p3+27q3+r3−9pqrp^3 + 27q^3 + r^3 – 9pqr

(viii) 9m2−12m+49m^2 – 12m + 4

(ix)

9x3−83y3+z33+6xyz9x^3 – \frac{8}{3}y^3 + \frac{z^3}{3} + 6xyz

(x)

(xi)

(i) $9x^2 + 24xy + 16y^2$

(ii) $4s^2 + 20st + 25t^2$

(iii) $49x^2 + 28xy + 4y^2$

(iv) $64p^2 + \frac{32}{3}pq + \frac{4}{9}q^2$

(v) $3a^2 + 4ab + \frac{4}{3}b^2$

(vi) $\frac{9}{5}s^2 + 6sv + 5v^2$

(i) $79^2$

(ii) $193^2$

(iii) $299^2$

(i) $117^2$

(ii) $78^2$

(iii) $198^2$

(iv) $214^2$

(v) $1104^2$

(vi) $1120^2$

(i) $16y^2 – 24y + 9$

(ii) $\frac{9}{4}s^2 + 6st + 4t^2$

(iii) $m^2 + mk + k^2 + 3nk + 2mn + 9n^2$

(iv) $\frac{p^2}{16} – 2 + \frac{16}{p^2}$

(v) $9a^2 + 4b^2 + c^2 – 12ab + 6ac – 4bc$

(a + b + c)² = a² + b²+ c² + 2ab + 2bc + 2ca

(i) $(p + 3q + 7r)^2$

(ii) $(3x – 2y + 4z)^2$

(i) $s^2 – 11s + 24$

(ii) $(\_\_\_)(x + 1) = 3x^2 – 4x – 7$ (___)

(iii) $10x^2 – 11x – 6 = (2x – \_\_)(\_\_ + 2)$

(iv) $6x^2 + 7x + 2 = (\_\_)(\_\_)$

(i) $41^2$

(ii) $27^2$

(iii) $23 \times 17$

(iv) $135^2$

(i) $9a^2 + b^2 + 4c^2 – 6ab + 12ac – 4bc$

(ii) $16s^2 + 25t^2 – 40st$

(iii) $r^2 – r – 42$

(i) $\dfrac{3p^2 – 3pq – 18q^2}{p^2 + pq – 10q^2}$

(ii) $\dfrac{n^3 – 5n^2m + 3nm^2 – m^3}{5m^2 – 10mn + 5n^2}$

(iii) $\dfrac{w^3 – v^3 + x^3 – wvx}{w^2 + v^2 + x^2 – wv – vx – wx}$

(iv) $\dfrac{4y^2 – 20yz + 25z^2}{(2z^2 – 4y^2)}$

(v) $\dfrac{(x^2 + x – 6)(x^2 – 7x + 12)}{(x^2 – 6x + 8)(x^2 – 9)}$

(vi) $\dfrac{p^4 – 16}{p^2 – 4p + 4}$

(i) $(-3x + 4)^2$

(ii) $(2s + 7)(2s – 7)$

(iii) $\left(p^2 + \frac{1}{2}\right)\left(p^2 – \frac{1}{2}\right)$

(iv) $(2n + 7)(2n – 7)$

(v) $(s – 2t)(s^2 + 2st + 4t^2)$

(vi) $\left(\frac{1}{2r} – 4r\right)^2$

(vii) $(-3m + 4k – l)^2$

(viii) $\left(x – \frac{1}{3}y\right)^3$

(ix) $\left(\frac{7}{2}k – \frac{2}{3}m\right)^3$

(i) $17 \times 21$

(ii) $104 \times 96$

(iii) $24 \times 16$

(iv) $147^3$

(v) $199^3$

(vi) $127^3$

(vii) $(-107)^3$

(viii) $(-299)^3$

(i) $4y^2 + 1 + \frac{1}{16y^2}$

(ii) $9m^2 – \frac{1}{25n^2}$

(iii) $27b^3 – \frac{1}{64b^3}$

(iv) $x^2 + \frac{5x}{6} + \frac{1}{6}$

(v) $27u^3 – \frac{1}{125} – \frac{27u^2}{5} + \frac{9u}{25}$

(vi) $64y^3 + \frac{1}{125}z^3$

(vii) $p^3 + 27q^3 + r^3 – 9pqr$

(viii) $9m^2 – 12m + 4$

$9x^3 – \frac{8}{3}y^3 + \frac{z^3}{3} + 6xyz$

(i) $25a^2 – 30ab + 9b^2$

(ii) $36s^2 – 49t^2$

(ii) $3ps^2 – 15ps + 12p$

(i) $x^{3} + y^{3} - 12 x y + 64$ , when $x + y = - 4$