How do you find the surface area generated when the curve $y = \sqrt{r^{2} - x^{2}}, 0 \leq x \leq a$ $y=sqrt(r^2-x^2), 0<=x<=a$ is rotated about the x axis?

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How do you find the surface area generated when the curve $y = \sqrt{r^{2} - x^{2}}, 0 \leq x \leq a$ $y=sqrt(r^2-x^2), 0<=x<=a$ is rotated about the x axis?

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Answer 1 · 2018-04-17T15:09:20

Take a piece of the curve whose length is the differential of arc length $ds = sqrt(1+(f'(x))^2) dx$

The surface area of the corresponding piece of the solid is

the circumference of revolution time the differential of arc length

which is

$2pif(x)sqrt(1+(f'(x))^2) dx$

Using just the values $0 <= x <=a$ , the surface area of the solid is

$2piint_0^a f(x)sqrt(1+(f'(x))^2) dx = 2pi int_0^a sqrt(r^2-x^2)sqrt(1+((-x)/sqrt(r^2-x^2))^2) dx$

$= 2pi int_0^a r dx$

$= 2pi r a$

Answer 2 · 2018-04-17T17:23:08

$A=2piar$

Explanation:

The formular is
$A=2piint_a^bf(x)sqrt(1+(f'(x))^2)dx$
$f(x)=y=sqrt(r^2-x^2)$
$f'(x)=-(x)/(sqrt(r^2-x^2)$
$A=2piint_0^asqrt(r^2-x^2)sqrt(1+(x^2)/(r^2-x^2))dx$
$<=>2piint_0^asqrt(r^2-x^2)sqrt(r^2/(r^2-x^2))dx$
$<=>2piint_0^ardx$
$<=>2pi[xr]_0^a$
$<=>2piar$

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How do you find the surface area generated when the curve $y = \sqrt{r^{2} - x^{2}}, 0 \leq x \leq a$ $y=sqrt(r^2-x^2), 0<=x<=a$ is rotated about the x axis?

2 Answers

Explanation:

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How do you find the surface area generated when the curve y=sqrt(r^2-x^2), 0<=x<=ay=√r2−x2,0≤x≤ay=sqrt(r^2-x^2), 0<=x<=a is rotated about the x axis?

2 Answers

Explanation:

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Impact of this question

How do you find the surface area generated when the curve $y = \sqrt{r^{2} - x^{2}}, 0 \leq x \leq a$ $y=sqrt(r^2-x^2), 0<=x<=a$ is rotated about the x axis?