Prove that tan2(x) + 1 = sec2(x)
We know that
sin2(x) + cos2(x) = 1
dividing both sides by cos2(x) we get
(sin2(x) + cos2(x))/cos2(x) = 1/cos2(x)
which equals
sin2(x)/cos2(x) + cos2(x)/cos2(x) = (1/cos(x))2
which can be re-written as
(sin(x)/(cos(x))2 + 1 = (1/cos(x))2
We know that tan2(x) = (sin(x)/(cos(x))2
and that (1/cos(x))2 = sec2(x)
So we can write
cot2(x) + 1 = sec2(x)
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3 comments:
there is a typo at the end you meant to say tan not cot
I convey my thanks to the writer for helping me .
Excellent
I convey my thanks to the writer for helping me .
Excellent
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