Area of simple curve bounded by

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SUMMARY

The area of the curve defined by the equation 2/sqrt(x) bounded by x = 0, y = 3, and y = 1 is calculated using two integrals. The correct area is determined to be 2 and 2/3, contradicting the textbook's claim of 3. The integration process involves both vertical and horizontal elements, with the vertical integral yielding an area of 8, while the horizontal integral confirms the area as 2 and 2/3. This discrepancy highlights an error in the textbook's solution.

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Homework Statement


Find the area of the curve 2/sqrt(x) bounded by x = 0, y = 3, y = 1


Homework Equations



The textbook claims the answer is 3.


The Attempt at a Solution



I tried both vertical and horizontal elements, but got different answers than 3.

Here's my attempt at vertical elements:

since y = 1 is the farthest right value of x, I solve 1 = 2/sqrt(x) for X to find x upper, which is 4.

Now I form my integral: integral(4-0) of 2/sqrt(x) (dx)

Integrate: 4 * sqrt(x)

Solve the definite integral: (4 * sqrt(4)) - (4 * sqrt(0)) = 8

What have I done wrong?
 
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When y= 3, x= 4/9. But your left boundary is x= 0 so you have the lines y= 1 and y= 3 as upper and lower bounds until x= 4/9. The area is
\int_0^{4/9} (3-1)dx+ \int_{4/9}^4 2/\sqrt{x}dx

What did you get when you integrated with respect to y?
 
Thanks I finally understand why I have to use two integrals to figure out this question if I use vertical elements.

For horizontal elements, I did this:

Integral(3-1): (4/y^2) (dy)

Integrate: -4 * y^(-1)

Solve: -4*(1/3) - (-4)(1)

Equals: 2 and 2/3

What did I do wrong this time?
 
Nothing. Unless you have stated the problem incorrectly, that is the correct answer.
 
My textbook is incorrect as I suspected. It claims the answer is 3.

Thanks for your help.
 

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