WebSimplify cot (x)tan (x) cot (x) tan(x) cot ( x) tan ( x) Rewrite cot(x)tan(x) cot ( x) tan ( x) in terms of sines and cosines. cos(x) sin(x) ⋅ sin(x) cos(x) cos ( x) sin ( x) ⋅ sin ( x) cos ( x) Cancel the common factors. 1 1 Web$\begingroup$ Hi , thanks! the question was : did the funtion tan(x) ,cot(x) has a symmetry axis , I tried to look at the function graph and see if there is a symmetry, i think there isn't one but I'm not sure how to get the full picture, and a good explanation why this is true without relying only on the function graph $\endgroup$ – Dima Shifrin
Simplify 1/(tan(x))+1/(cot(x)) Mathway
WebSimplify cos (x) (tan (x)+cot (x)) cos (x) (tan (x) + cot (x)) cos ( x) ( tan ( x) + cot ( x)) Simplify each term. Tap for more steps... cos(x)( sin(x) cos(x) + cos(x) sin(x)) cos ( x) ( sin ( x) cos ( x) + cos ( x) sin ( x)) Simplify terms. Tap for more steps... sin(x)+cos(x) cos(x) sin(x) sin ( x) + cos ( x) cos ( x) sin ( x) WebJan 27, 2013 · Ask a question for free Get a free answer to a quick problem. Most questions answered within 4 hours. new nayelimouth
Simplify cot(x)tan(x) Mathway
Webtan^2 = sin^2+cos^2 = 1 << this we can agree on the solutions tell us to divide both sides by cos^2. so sin^2/cos^2 + cos^2/cos^2 = 1/cos^2 and 1/cos^2 is sec^2 << still following then somehow it says therefore tan^2-1 = sec^2 so it replaces the entire first argument with sec^2, completely ignoring that 1 we were supposed to deduct from tan. http://www.math.com/tables/trig/identities.htm WebThe second bounce should be at x=arcsin (±2π)~1.41297, where the value of cos (tan (x)) becomes 1. From here you may notice that there is a significant decrease in the gap … new nayelishire