Math, asked by shivpoojanthakur41, 11 months ago

Prove that sin squared theta +sin theta is equlal to 1

Answers

Answered by pittupiyush82
0

Answer:

no no no no no

Step-by-step explanation:

not possible

Answered by Anonymous
1

Consider the provided information.

\sin^2A\cos^2B-\cos^2A\sin^2B=\sin^2A-\sin^2B

Consider the LHS.

\sin^2A\cos^2B-\cos^2A\sin^2B

\sin^2A(1-\sin^2B)-(1-\sin^2A)\sin^2B               (∴\cos^2x=1-\sin^2x)

\sin^2A-\sin^2A\sin^2B-\sin^2B+\sin^2A\sin^2B

\sin^2A-\sin^2B

Hence, proved.

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