Asked by Trig
sec^2xcotx-cotx=tanx
(1/cos)^2 times (1/tan)-(1/tan)=tan
(1/cos^2) times (-2/tan)=tan
(-2/cos^2tan)times tan=tan(tan)
sq. root of (-2/cos^2)= sq. root of (tan^2)
sq. root of (2i)/cos=tan
I'm not sure if I did this right. If I didn't, can you show me the correct steps?
Thanks, I appreciate it.
(1/cos)^2 times (1/tan)-(1/tan)=tan
(1/cos^2) times (-2/tan)=tan
(-2/cos^2tan)times tan=tan(tan)
sq. root of (-2/cos^2)= sq. root of (tan^2)
sq. root of (2i)/cos=tan
I'm not sure if I did this right. If I didn't, can you show me the correct steps?
Thanks, I appreciate it.
Answers
Answered by
Marth
sec^2(x)cot(x) - cot(x) = tan(x)
Convert everything to sine and cosine using the identity tan(x) = sin(x)/cos(x).
cos^-2(x)(cos(x)/sin(x)) - cos(x)/sin(x) = sin(x)/cos(x)
1/( cos(x)sin(x) ) - cos(x)/sin(x) = sin(x)/cos(x)
Note: it is important to write sin(x) as opposed to sin, because you may find equations that include different parameters -- sin(x) and sin(2x), for example.
Convert everything to sine and cosine using the identity tan(x) = sin(x)/cos(x).
cos^-2(x)(cos(x)/sin(x)) - cos(x)/sin(x) = sin(x)/cos(x)
1/( cos(x)sin(x) ) - cos(x)/sin(x) = sin(x)/cos(x)
Note: it is important to write sin(x) as opposed to sin, because you may find equations that include different parameters -- sin(x) and sin(2x), for example.
Answered by
naveen
tan7.50
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