Question #b9e87

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Question #b9e87

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Answer 1 · 2017-05-04T19:10:01

It all depends on where you wish to take this. One option is:

$\frac{tan (x)}{cos (x)} = \frac{sin (x)}{1 - {sin}^{2} (x)}$ $(tan(x))/(cos(x))" "=" "sin(x)/(1-sin^2(x))$

Explanation:

Tony B

SohCahToa

Soh $\to sin (x) = \frac{opposite}{hypotenuse} \to \frac{b}{a}$ $-> sin(x)=("opposite")/("hypotenuse") ->b/a$

Cah $\to cos (x) = \frac{adjacent}{hypotenuse} \to \frac{c}{a}$ $->cos(x)=("adjacent")/("hypotenuse")->c/a$

Toa $\to tan (x) = \frac{opposite}{adjacent} \to \frac{b}{c}$ $->tan(x)=("opposite")/("adjacent")->b/c$

$tan (x) = \frac{sin (x)}{cos (x)}$ $tan(x)=(sin(x))/(cos(x))$
~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~

Let the unknown term be $β$ $beta$

Given equation: $(tan(x))/(cos(x))=beta" ".........Equation(1)$

Write as: $" "tan(x)xx1/(cos(x))=beta$

But $tan(x)=(sin(x))/(cos(x))$ so by substitution we have:

$" "(sin(x))/(cos(x))xx1/(cos(x))=beta$

$" "sin(x)/(cos(x))^2=beta$

This is written as:

$" "sin(x)/cos^2(x)=beta" "...............Equation(2)$

~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
As in the Pythagoras equation $a^2=b^2+c^2$
There is a comparable one involving $cos^2(x)$

$"Pythagorean relationship"->sin^2(x)+cos^2(x)=1$

So $" "cos^2(x)=1-sin^2(x)" ".............Equation(3)$

Using $Equation(3)$ substitute for $cos^2(x)$ in $Equation(2)$

$" "sin(x)/cos^2(x)=beta" "->" "sin(x)/(1-sin^2(x))=beta$
~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
Thus the finished relationship is:

$" "(tan(x))/(cos(x))" "=" "beta" "=" "sin(x)/(1-sin^2(x))$

Answer 2 · 2017-05-04T19:20:27

$sin(x)/cos^2(x)$ or $sin(x)/(1-sin^2(x))$

Explanation:

First of all, what are $tan(x)$ and $cos(x)$ ?

Both are trigonometric functions, but $tan(x)$ is actually a function of both $sin(x)$ and $cos(x)$ :

$tan(x)=sin(x)/cos(x)$

Substitute this in for the numerator in the original problem:

$tan(x)/cos(x)=(sin(x)/cos(x))/cos(x)$

Remember that dividing by anything is the same as multiplying by the reciprocal of that thing. In other words, the following is mathematically valid:

$a/b=a*1/b$

Applying this to our equation, we see that:

$(sin(x)/cos(x))/cos(x)=sin(x)/cos(x)*1/cos(x)$

Simplifying, we get:
$sin(x)/cos(x)*1/cos(x)=sin(x)/cos^2(x)$

If we want our answer to be in terms of $sin(x)$ , we could go further and use the identity: $cos^2(x)+sin^2(x)=1$

Replacing $cos^2(x)$ , we get:

$sin(x)/(1-sin^2(x))$

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