Can you help me with this double integral?

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Can you help me with this double integral?

$\int \int_{D} (y^{2} - x) d A$ $intint_D (y^2-x)dA$ where D is limited by y=x-6 , $y^{2} = x$ $y^2=x$

2 Answers

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Answer 1 · 2018-06-11T18:40:03

Please see below.

Explanation:

Sketch the region $D$ $D$ , shown below.

enter image source here

Now describe the region so that we can integrate either w.r.t $x$ $x$ first and then $y$ $y$ or integrate first w.r.t. $y$ $y$ , the $x$ $x$ .

We can describe the region in either of two ways.

Method 1
One description notes that we can integrate with respect to $x$ $x$ second, using constant limits of i=ntegration $0$ $0$ and $9$ $9$ .
But not really.

As $x$ $x$ varies from $0$ $0$ to $4$ $4$ , the values of $y$ $y$ go from the lower half parabola ( $y = - \sqrt{x}$ $y = -sqrtx$ ) to the upper half parabola ( $y = \sqrt{x}$ $y = sqrtx$ ).
The bounds on $y$ $y$ are different as $x$ $x$ varies from $4$ $4$ to $9$ $9$

This lead to the two double integrals

$int_0^4 int_(-sqrtx)^(sqrtx)(y^2-x) \ dy \ dx + int_4^9 int_(x-6)^(sqrtx) (y^2-x) \ dy \ dx$

Method 2
I think it is simpler to note that $y$ varies from $-2$ to $3$ ,
and on that entire interval, $x$ varies from the parabola ( $x=y^2$ ) to the line ( $x=y-6$ )

This allows us to use the one double integral:

$int_(-2)^3 int_(y^2)^(y+6) (y^2-x) \ dx \ dy$ .

Answer 2 · 2018-06-11T18:42:38

I believe the following to be a correct way to do this integration but I will request a double check so that one of my peers will review it.

Explanation:

Express the limits as x in terms of y:

$x = y^2, x = y+6$

The following is a graph of the area:

![www.desmos.com]( useruploads.socratic.org )

In terms of x, $y^2$ is the lower limit, therefore, the integration with respect to x is from $y^2$ to $y+6$ :

$int int_(y^2)^(y+6) (y^2-x)dxdy$

There are two ways to find the limits of y, solve the quadratic that results from setting $y^2$ equal to $y + 6$ , or observe the y coordinate where the line insects the parabola; I shall do the former:

$y^2 = y+6$

$y^2 -y - 6 = 0$

$(y+2)(y-3) = 0$

$y=-2 and y=3$

Please observe that the graph confirms this result.

The integration with respect to y is from $-2$ to $3$ :

$int_-2^3 int_(y^2)^(y+6) (y^2-x)dxdy$

Integrate with respect to x:

$int_-2^3 {:y^2x-1/2x^2|_(y^2)^(y+6)dy$

Evaluate at the limits:

$int_-2^3 y^2(y+6)-1/2(y+6)^2-y^2(y^2)+1/2(y^2)^2dy$

Simplify:

$int_-2^3 -y^4/2 + y^3 + (11 y^2)/2 - 6 y - 18dy$

Integrate:

$-y^5/10 + y^4/4 + (11 y^3)/6 - 3 y^2 - 18 y |_-2^3$

Evaluate at the limits:

$-(3)^5/10 + (3)^4/4 + (11 (3)^3)/6 - 3 (3)^2 - 18 (3)- (-(-2)^5/10 + (-2)^4/4 + (11 (-2)^3)/6 - 3 (-2)^2 - 18 (-2)) = -625/12$

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Can you help me with this double integral?

$\int \int_{D} (y^{2} - x) d A$ $intint_D (y^2-x)dA$ where D is limited by y=x-6 , $y^{2} = x$ $y^2=x$

2 Answers

Explanation:

Explanation:

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Humanities

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Can you help me with this double integral?

intint_D (y^2-x)dA∫∫D(y2−x)dAintint_D (y^2-x)dA where D is limited by y=x-6 , y^2=xy2=xy^2=x

2 Answers

Explanation:

Explanation:

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$\int \int_{D} (y^{2} - x) d A$ $intint_D (y^2-x)dA$ where D is limited by y=x-6 , $y^{2} = x$ $y^2=x$