What is the net area between $f(x) = cotxcscx -sinx$ and the x-axis over $x in [pi/6, (5pi)/8 ]$ ?

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What is the net area between $f(x) = cotxcscx -sinx$ and the x-axis over $x in [pi/6, (5pi)/8 ]$ ?

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Answer 1 · 2016-03-26T01:49:41

$A=A_1+A_2=2-1/sin((5pi)/8)+cos((5pi)/8)-sqrt(3)/2~~-.331$

Explanation:

$A = int_(pi/6)^((5pi)/8) (cotxcscx - sinx) dx$
$A_1+A_2=int_(pi/6)^((5pi)/8) cotxcscx dx - int_(pi/6)^((5pi)/8)sinx dx$
$A_1 = int_(pi/6)^((5pi)/8) cotxcscx dx$
$int_(pi/6)^((5pi)/8) cosx/sinx*1/sinx dx= int_(pi/6)^((5pi)/8) cosx/sin^2x dx$

Let $u = sinx => (du)/dx= cosx$ then rewrite the integral as:
$A_1=int (du)/u^2= -1/u$ substitute u=sinx
$A_1=-1/sinx= -[cscx]_(pi/6)^((5pi)/8) = 2-1/sin((5pi)/8)$

$A_2=int_(pi/6)^((5pi)/8)sinx dx= [-cosx]_(pi/6)^((5pi)/8)$
$A_2= cos((5pi)/8) -sqrt(3)/2$

$A=A_1+A_2=2-1/sin((5pi)/8)+cos((5pi)/8)-sqrt(3)/2~~-.331$

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What is the net area between $f(x) = cotxcscx -sinx$ and the x-axis over $x in [pi/6, (5pi)/8 ]$ ?

1 Answer

Explanation:

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1 Answer

Explanation:

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What is the net area between $f(x) = cotxcscx -sinx$ and the x-axis over $x in [pi/6, (5pi)/8 ]$ ?