Prove that $\frac{cos x cot x}{1 - sin x} - 1 = csc x$ $(cosxcotx)/(1 - sinx) - 1 = cscx$ ?

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Prove that $\frac{cos x cot x}{1 - sin x} - 1 = csc x$ $(cosxcotx)/(1 - sinx) - 1 = cscx$ ?

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Answer 1 · 2016-05-12T00:46:29

We start with:

$\frac{cos x cot x}{1 - sin x} - 1 ? = csc x .$ $color(green)((cosxcotx)/(1-sinx) - 1 stackrel(?)(=) cscx).$

First, recall $cot x = \frac{cos x}{sin x}$ $cotx = cosx/sinx$ (since $cot x = \frac{1}{tan x}$ $cotx = 1/tanx$ and $tan x = \frac{sin x}{cos x}$ $tanx = sinx/cosx$ ). That gives you:

$\frac{cos x \cdot \frac{cos x}{sin x}}{1 - sin x} - 1 = csc x$ $(cosx*cosx/sinx)/(1-sinx) - 1 = cscx$

$\frac{\frac{{cos}^{2} x}{sin x}}{1 - sin x} - 1 = csc x$ $(cos^2x/sinx)/(1-sinx) - 1 = cscx$

On the fraction you can move the middle $sin x$ $sinx$ into the denominator.

$\frac{{cos}^{2} x}{sin x (1 - sin x)} - 1 = csc x$ $cos^2x/(sinx(1-sinx)) - 1 = cscx$

Now, when you have a $1$ $1$ , that gives you a lot of freedom. You can choose to have it be equal to any ratio you want, as long as it cancels out to be $1$ $1$ . So choose $1 = \frac{sin x (1 - sin x)}{sin x (1 - sin x)}$ $1 = (sinx(1-sinx))/(sinx(1-sinx))$ to get:

$\frac{{cos}^{2} x}{sin x (1 - sin x)} - \frac{sin x (1 - sin x)}{sin x (1 - sin x)} = csc x$ $cos^2x/(sinx(1-sinx)) - (sinx(1-sinx))/(sinx(1-sinx)) = cscx$

Distribute the numerator and combine into one fraction:

$\frac{- sin x + {cos}^{2} x + {sin}^{2} x}{sin x (1 - sin x)} = csc x$ $(-sinx + cos^2x + sin^2x)/(sinx(1-sinx)) = cscx$

Then recall ${sin}^{2} x + {cos}^{2} x = 1$ $sin^2x + cos^2x = 1$ to cancel out the $1 - sin x$ $1-sinx$ .

$cancel(1 - sinx)/(sinxcancel((1-sinx))) = cscx$

$1/sinx = cscx$

$color(blue)(cscx = cscx)$

Answer 2 · 2016-05-12T00:48:35

It is a bit long but...

Explanation:

You can try changing all in $sin$ and $cos$ as:
$cot(x)=cos(x)/sin(x)$
$csc(x)=1/sin(x)$
Your identity becomes:

$(cos(x)*cos(x)/sin(x))/(1-sin(x))-1=1/sin(x)$
we use $(1-sin(x))(sin(x))$ as common denominator and write rearranging:
$(cos^2(x)-sin(x)(1-sin(x)))/cancel((1-sin(x))(sin(x)))=(1-sin(x))/cancel((1-sin(x))(sin(x)))$

and:
$cos^2(x)-sin(x)(1-sin(x))=1-sin(x)$
$cos^2(x)-sin(x)+sin^2(x)=1-sin(x)$
but:
$cos^2(x)+sin^2(x)=1$
so we get:
$1-sin(x)=1-sin(x)$ which is true.

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Prove that $\frac{cos x cot x}{1 - sin x} - 1 = csc x$ $(cosxcotx)/(1 - sinx) - 1 = cscx$ ?

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Explanation:

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