How do you prove that #sin^2x+ cos^2x = 1#?

1 Answer
Noah G
Apr 13, 2017

Consider a right triangle with sides #a, b, c# with #a < b < c#.

By pythagoras,

#a^2 + b^2 = c^2#

#sqrt(a^2 + b^2) = c ->#because #c# must be positive. We now let the angle opposite side #a# be #theta#. Since #sintheta = a/c# and #costheta = b/c#, we have:

#sqrt((c(sin theta))^2 + (c(costheta)^2) = c#

#sqrt(c^2(sin^2theta + cos^2theta)) = c#

#csqrt(sin^2theta + cos^2theta) = c#

And so #sqrt(sin^2theta + cos^2theta) = 1#, which means that #sin^2theta + cos^2theta = 1#, so our proof is complete.

Hopefully this helps!

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