How to solve this problem?

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How to solve this problem?

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Answer 1 · 2017-08-14T22:23:33

Answer d is correct.

Explanation:

I would use identities.

We know that ${sin}^{2} x + {cos}^{2} x = 1$ $sin^2x + cos^2x = 1$ , then we have:

${(\frac{5}{13})}^{2} + {cos}^{2} x = 1$ $(5/13)^2 + cos^2x = 1$

${cos}^{2} x = 1 - \frac{25}{169}$ $cos^2x = 1 - 25/169$

${cos}^{2} x = \frac{144}{169}$ $cos^2x = 144/169$

$cos x = \pm \frac{12}{13}$ $cosx = +-12/13$

However, we know the answer must be negative because of the C-A-S-T rule, which is shown in the following picture.

enter image source here

So only sine is positive on $\frac{π}{2} < x < π$ $pi/2 < x < pi$ , which is equivalent to $90˚ < x <180˚$ . So cosine will be $-12/13$ .

Now we can use the quotient identity, which states that $tantheta = sintheta/costheta$ . This stems from a right triangle with sides $x$ and $y$ and hypotenuse $r$ . If $theta$ is adjacent $x$ and opposite $y$ , then the ratios are

$costheta = x/r$
$sintheta = y/r$
$tantheta = y/x$

Now notice that

$(y/r)/(x/r) = y/x$ or $sintheta/costheta = tantheta$

$tantheta = sintheta/costheta = (5/13)/(-12/13) = -5/12$

So answer d.

Hopefully this helps!

Answer 2 · 2017-08-14T22:40:02

$"d)"$ $- frac(5)(12)$

Explanation:

We know that $sin(theta) = frac(5)(13)$ .

$sin(theta)$ is also equal to $frac("opposite")("hypotenuse")$ .

$Rightarrow frac("opposite")("hypotenuse") = frac(5)(13)$

So, the opposite and hypotenuse are equal to $5$ and $13$ , or they can be multiples of them.

For this problem, we can simply consider the opposite and hypotenuse to be $5$ and $13$ , respectively.

The hypotenuse of a triangle is its longest side.

Using Pythagoras' theorem:

$Rightarrow "opposite"^(2) + "adjacent"^(2) = "hypotenuse"^(2)$

$Rightarrow 5^(2) + "adjacent"^(2) = 13^(2)$

$Rightarrow "adjacent"^(2) = 13^(2) - 5^(2)$

$Rightarrow "adjacent"^(2) = 169 - 25$

$Rightarrow "adjacent"^(2) = 144$

$Rightarrow sqrt("adjacent"^(2)) = pm sqrt(144)$

$therefore "adjacent" = pm 12$

Now, $tan(theta)$ is equal to $frac("opposite")("adjacent")$ :

$Rightarrow tan(theta) = frac(5)(pm 12)$

The interval that we are provided with is $frac(pi)(2) < theta < pi$ , i.e. the second quadrant.

In the second quadrant, all values of $tan(theta)$ are negative.

So, $tan(theta)$ cannot be equal to $frac(5)(+ 12) = frac(5)(12)$ .

Therefore, $tan(theta)$ is equal to $frac(5)(- 12) = - frac(5)(12)$ .

In conclusion, the final answer is $"d)"$ $- frac(5)(12)$ .

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