Question

Show that :

$\left(i\right){(3x+7)}^2-84x={(3x-7)}^2$

$\left(ii\right){(4pq+3q)}^2-{(4pq-3q)}^2=48p{q}^2$

$\left(iii\right)(a-b)(a+b)+(b-c)(b+c)+(c-a)(c+a)=0$ [3 MARKS]

Answer 1

Application: 1 Mark each

$\left(i\right)(3x+7{)}^2-84x\Rightarrow L.H.S$

$\Rightarrow (3x{)}^2+7^2+2(3x\left)\right(7)-84x$

$\Rightarrow 9x^2+49+42x-84x$

$\Rightarrow 9x^2+49-42x=L.H.S$

$R.H.S\Rightarrow (3x-7{)}^2\Rightarrow [(3x{)}^2+(7{)}^2-2\left(3x\right)7]$

$\Rightarrow 9x^2+49-42x=R.H.S$

$L.H.S=R.H.S$


$\left(ii\right)(4pq+3q{)}^2-(4pq-3q{)}^2=48p{q}^2$

$L.H.S\Rightarrow \left[\right(4pq+3q)+(4pq-3q\left)\right]\left[\right((4pq+3q)-(4pq-3q)\left)\right]$

$\Rightarrow [4pq+3q+4pq-3q][4pq+3q-4pq+3q]$

$\Rightarrow \left(8pq\right)\left(6q\right)$

$\Rightarrow 48p{q}^2$

$\Rightarrow R.H.S$


$\left(iii\right)(a-b)(a+b)+(b-c)(b+c)+(c-a)(c+a)=0$

$L.H.S\Rightarrow \left[\right(a{)}^2-\left(b{)}^2\right]+\left[\right(b{)}^2-\left(c{)}^2\right]+\left[\right(c{)}^2-a^2]$

$\Rightarrow a^2-b^2+b^2-c^2+c^2-a^2$

$\Rightarrow 0=R.H.S$