Difference between revisions of "005 Sample Final A, Question 14"

Latest revision as of 09:54, 2 June 2015

Question Prove the following identity,

{\frac {1-\sin(\theta )}{\cos(\theta )}}={\frac {\cos(\theta )}{1+\sin(\theta )}}

Foundations:
1) What can you multiply $1-\sin(\theta )$ by to obtain a formula that is equivalent to something involving $\cos$ ?
Answers:
2) You can multiply $1-\sin(\theta )$ by ${\frac {1+\sin(\theta )}{1+\sin(\theta )}}$

Step 1:
We start with the left hand side. We have ${\frac {1-\sin(\theta )}{\cos(\theta )}}={\frac {1-\sin(\theta )}{\cos(\theta )}}{\Bigg (}{\frac {1+\sin(\theta )}{1+\sin(\theta )}}{\Bigg )}$ .

Step 2:
Simplifying, we get ${\frac {1-\sin(\theta )}{\cos(\theta )}}={\frac {1-\sin ^{2}(\theta )}{\cos(\theta )(1+\sin(\theta ))}}$ .

Step 3:
Since $1-\sin ^{2}(\theta )=\cos ^{2}(\theta )$ , we have
${\frac {1-\sin(\theta )}{\cos(\theta )}}={\frac {\cos ^{2}(\theta )}{\cos(\theta )(1+\sin(\theta ))}}={\frac {\cos(\theta )}{1+\sin(\theta )}}$

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 |Answers:
 |-
-|1) You can multiply <math>1 - \sin(\theta)</math> by <math>\frac{1 + \sin(\theta)}{\1 + \sin(\theta)}</math>
+|2) You can multiply <math>1 - \sin(\theta)</math> by <math>\frac{1 + \sin(\theta)}{1 + \sin(\theta)} </math>
 |}