integral calculus: plane areas in rectangular coordinates

delapcsoncruz

1. The problem statement, all variables and given/known data

Find the area between y= 1/(x²+1) and the x-axis, from x=0 to x=1

3. The attempt at a solution

so when x=0, y=1
and when x=1, y=1/2

next i plot the points, so the intersection of the given equation is (0,1) and (1,1/2)
Yh= Y-higher= 1/(x²+1)
Yl= Y-lower= 0
the strip is vertical, so the length (L) = (Yh-Yl) and the width (W) is dx

dA=LW
dA=(Yh-Yl)dx
dA=(1/(x²+1))dx
A=∫from 0-1 dx/(x²+1)
A=Arctan x from 0-1
A=Arctan 1 -Arctan 0
A=pi/4 sq.units

was my solution correct?

lanedance

looks good to me

SammyS

Quote by delapcsoncruz

1. The problem statement, all variables and given/known data

Find the area between y= 1/(x²+1) and the x-axis, from x=0 to x=1

3. The attempt at a solution

so when x=0, y=1
and when x=1, y=1/2

next i plot the points, so the intersection of the given equation is (0,1) and (1,1/2)
Yh= Y-higher= 1/(x²+1)
Yl= Y-lower= 0
the strip is vertical, so the length (L) = (Yh-Yl) and the width (W) is dx

dA=LW
dA=(Yh-Yl)dx
dA=(1/(x²+1))dx
A=∫from 0-1 dx/(x²+1)
A=Arctan x from 0-1
A=Arctan 1 -Arctan 0
A=pi/4 sq.units

was my solution correct?

Yes.

You went through a lot of steps to get the answer.

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