Deriving Relations from tanA=y/x

miccol999 · Nov 15, 2007

Given tanA=y/x.....(1)

Can anyone tell me how you get the following relations:

=>sinA=ay/sqrt(x^2+y^2).....(2)
=>cosA=ax/sqrt(x^2+y^2)....(3)

where a=(+/-)1

I know tanA=sinA/cosA and sin^2(A)+cos^2(A)=1...and I can see by substituting (2) and (3) into (1) it works, but I really can't work out how to come up with them! I know I'm probably overlooking something quite obvious but its late+I'm not trusting my own judgement atm!

hage567 · Nov 15, 2007

You've got the right approach. Can you show all of your steps so we can pick out where you're going wrong?

Dick · Nov 15, 2007

tan(A)=sin(A)/cos(A)=y/x. So y*cos(A)=x*sin(A). Now put in sin(A)=+/-sqrt(1-cos(A)^2) and solve for cos(A) by squaring both sides. Ditto for sin(A).

HallsofIvy · Nov 16, 2007

Given Tan(A)= x/y, the first thing I would do is draw a right triangle having angle A, "opposite side" of length x, "near side" of length y, and then calculate the length of the hypotenuse. Once you have done that, the other trig functions fall into place.

Deriving Relations from tanA=y/x

Related to Deriving Relations from tanA=y/x

1. What is the definition of "tanA=y/x"?

2. How do you derive relations from tanA=y/x?

3. What are the applications of "tanA=y/x" in real life?

4. Can "tanA=y/x" be used for non-right triangles?

5. Is "tanA=y/x" the same as "sinA=y/x"?

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