Math, asked by joshisvt2370, 11 hours ago

If sin theta cos theta are the roots of x square + qx + r is is equal to zero then find the value q2-p2

Answers

Answered by madhav127
0

Answer:

hey mate

Step-by-step explanation:

here is ur ans

hope it help u

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Answered by NITESH761
0

Answer:

\rm q^2-p^2=2pr

Step-by-step explanation:

\rm px^2 + qx +r=0

\rm ( \sin θ + \cos θ ) = \dfrac{q}{p}

\rm ( \sin θ + \cos θ )^2 = \dfrac{q^2}{p^2}

\rm 1+2 \bigg(\dfrac{r}{p} \bigg) = \dfrac{q^2}{p^2}

\rm \dfrac{p+2r}{p} = \dfrac{q^2}{p^2}

\rm p(p+2r)=q^2

\rm p^2+2pr=q^2

\rm 2pr=q^2-p^2

\rm q^2-p^2=2pr

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