Cosx, ctgx, если sinx=1/5

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Given that sinx = 1/5, we can find cosx by using the Pythagorean identity sin^2x + cos^2x = 1.

sinx = 1/5
sin^2x = 1/25
cos^2x = 1 - sin^2x
cos^2x = 1 - 1/25
cos^2x = 24/25
cosx = ±√(24/25)
cosx = ±4/5

Next, we can find ctgx by using the identity ctgx = cosx/sinx.

ctgx = cosx/sinx
ctgx = (4/5) / (1/5)
ctgx = 4

Therefore, cosx can be either 4/5 or -4/5, and ctgx is 4.