Find the values of the trigonometric functions of t from the given information. tan(t) = -9, csc(t) > 0
Establish the identity (tan 0 + cote) cos 0 = csc Write the left side in terms of sine and cosine. cos Simplify the expression inside the parentheses from the previous step and write the result in terms of sine and cosine. cos Simplify the expression from the previous step and write the result in terms of sin 0 The fraction from the previous step then simplifies to csc using what? O A. Reciprocal Identity OB. Quotient Identity Puthannroan Identity...
tan 0 24) Simplify: seco A)sin 0 B)cos e C)csc 0 D)sin 0 – csc O E) csc 0 – sin 0
verify identity (c). tan- = csc 0 - cot
, then find exact values for the following: sec(0) equals Preview csc() equals Preview tan() equals Preview cot() equals Preview Get help: Video
Rewrite the following expression in terms of the given function. tan x + cotx secx CSC X tan x + cotx CSC X
Verify the following identity tan(0) + cot(0) csc(20) = 2
please solve these questions for me, thanks! 1) csc 23 Find the value of the trig function indicated. 35 3) csc 9 4) tan e 22 14 5) tan e 15 12 102 6) sec 0 15
Find sin(a) and cos(B), tan(a) and cot(B), and sec(a) and cSC(B). a 14 B (a) sin(a) and cos() (b) tan(a) and cot(6) (c) sec(a) and csc()
Solve the equation for the interval [0, 2π). tan x + sec x = 1 csc^5x - 4 csc x = 0 sin^2x - cos^2x = 0 sin^2x + sin x = 0