1 Answer

Greenish · Answer 1 · 2022-03-21T02:34:10+0000

Answer:

$\displaystyle y=(2√(3))/(15)x+(\pi-2√(3))/(6)$

Explanation:

We want to find the equation of the line tangent to the graph of:

$\displaystyle y=\sin^(-1)\left((x)/(5)\right)\text{ at } x=(5)/(2)$

So, we will find the derivative of our equation first. Applying the chain rule, we acquire that:

$\displaystyle y^\prime=\frac{1}{\sqrt{1-\left((x)/(5)\right)^2}}\cdot(1)/(5)$

Simplify:

$\displaystyle y^\prime=\frac{1}{5\sqrt{1-(x^2)/(25)}}$

We can factor out the denominator within the square root:

$\displaystyle y^\prime =\frac{1}{5\sqrt{(1)/(25)\big(25-x^2)}}$

Simplify:

$\displaystyle y^\prime=(1)/(√(25-x^2))$

So, we can find the slope of the tangent line at x = 5/2. By substitution:

$\displaystyle y^\prime=(1)/(√(25-(5/2)^2))$

Evaluate:

$\displaystyle y^\prime=(1)/(√(75/4))=(1)/((5√(3))/(2))=(2√(3))/(15)$

We will also need the point at x = 5/2. Using our original equation, we acquire that:

$\displaystyle y=\sin^(-1)\left((1)/(2)\right)=(\pi)/(6)$

So, the point is (5/2, π/6).

Finally, by using the point-slope form, we can write:

$\displaystyle y-(\pi)/(6)=(2√(3))/(15)\left(x-(5)/(2)\right)$

Distribute:

$\displaystyle y-(\pi)/(6)=(2√(3))/(15)x+(-√(3))/(3)$

Isolate. Hence, our equation is:

$\displaystyle y=(2√(3))/(15)x+(\pi-2√(3))/(6)$

Please log in or register to add a comment.