Find the zero of the polynomial :$p(x)=2x^2+13x-7$

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Find the zero of the polynomial : $p(x)=2x^2+13x-7$

A-7

B $\frac{3}{4}$

C $\frac{2}{13}$

D $\frac{1}{2}$

Answer:

\frac{1}{2}

$p(x)=2x^2+13x-7$

To find the zero of the polynomial $p(x)=0$

$p(x)=2x^2+13x-7=0$

$2x^2+14x-1x-7=0$

$2x(x+7)-1(x+7)=0$

$(2x-1)(x+7)=0$

either(2x-1)=0 or (x + 7) = 0

If $2x - 1 = 0$

$2x-1=0$

$2x=1$

$x=1/2$

If x + 7 = 0

$x + 7=0$

$x= -7$

root of polynomial is always positive

so here root = $\frac{1}{2}$ .

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