Simplify the left hand side so that L H S = R H S : ( tan ( a )) + ((1)/ (cos ( a )))^ 2= (1+sin(a)) / (1−sin(a))
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=(1+sin(a))/(1−sin(a))
On the back, prove the identity: tan^3(x)csc^2(x)cot^2(x)cos(x)sin(x)=1 Use only the left side and try changing everything to sine and cosine. Original Question Image: On the back, prove the identity: tan'(r)csc(r)cot'(x)cos(x)sin(r)-1 Use only the left side and try changing everything to sine and cosine.
Verify that the equation is an identity. sin x cOS X secx + = sec?x-tan? CSC X Both sides of this identity look similarly complex. To verify the identity, start with the left side and simplify it. Then work with the right side and try to simplify it to the same result. Choose the correct transformations and transform the expression at each step COS X sin x secx CSC X The left-hand side is simplified enough now, so start working...
1. (6.3 #23) Verify the identity by transforming the left-hand side into the right-hand side. Show all steps. cot(-x) COS X csc(-x) (2)
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...
A mass m is dropped from rest from a height h above the left hand side of a frictionless bowl where it meets the side of the bowl exactly after falling h and starts to slide down the side of the bowl with some initial velocity where it then collides with a 4m mass sitting at the bottom. The 4m mass makes it exactly up to the rim of the bowl on the right hand side and the m mass...
Verify the following identity. sin? x + cos2x = cos? To transform the left side into the right side, should be changed to and the left side simplified. Enter your answer in the answer box. Use the power-reducing formulas to rewrite the expression as an equivalent expression that does not contain powers of trigonometric functions greater than 1 40 sin?x cos? 40 sin’x cos2x = 0 Enter your answer in the answer box. Express the given product as a sum...
hi tutor, I need help with this homework problem please. please look at the photos. I took 2 photos of the same question so you can see whoch one is more clear. you may have to zoom. thanks. 11. [-15 Points] DETAILS LARPCALC10 5.2.034. Verify the identity by converting the left side into sines and cosines. (Simplify at each step.) tan(x) - cot(x) = sec(x)(2 sin(x) - cse(x)) tan(x) - cot(x) sin(x) COS(X) cos(X) sin(x) sin?(x) cos(x) sin(x) (sin?(X) sin?(x))...
please simplify Problem 2.3 Evaluate or simplify the following integrals or expression as much as possible (show your work). (a) L, 8(t)x(t – 1)dt (e) , 8(at)dt (i) cos(10zt) [8(t) + 8(t + 5)] sin (b) 8(t – T)x(t)dt (f) 8(2t – 5) sin nt dt (c) L 8(t)x(r – t)dt cos (x - 5)|6(x – 3)dx (sin ke (B) e*-2 8(w) (k) 6(r – t)x(t)dt (d) (h) Jt-11 t+9 8(1 – 3)đr Problem 2.3 Evaluate or simplify the following...
Verify the identity sin ( - = cos 0 Write the left side of the identity using a sum or difference formula for sine or cosine. (Do not simplify.) The expression from the previous step then simplifies to cos 0 using what?
s Question: 1 pt nest 2 - Chapte 11 - 11:50 AM Simplify: tan + cote O A. 2 csc (20) OB. 1 O c. sin + cos e OD. 2 sin (20) elect your answer