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Question Watch Video Show Examples Let the region R be the area enclosed the function \( f(x)=\sqrt{x}-1 \), the horizontal line \( y=1 \), and the \( y \)-axis. Write an integral in terms of \( x \) and also an integral in terms of \( y \) that would represent the area of the region R . If necessary, round limit values to the nearest thousandth. Answer Attempt 1 out of 2 \[ x_{1}=\square x_{2}=\square \int_{x_{1}}^{x_{2}}[\square d x \] \[ y_{1}=\square y_{2}=\square \int_{y_{1}}^{y_{2}}[\square] d y \]

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Let the region R be the area enclosed the function \( f(x)=\sqrt{x}-1 \), the horizontal line \( y=1 \), and the \( y \)-axis. Write an integral in terms of \( x \) and also an integral in terms of \( y \) that would represent the area of the region R . If necessary, round limit values to the nearest thousandth.

Answer Attempt 1 out of 2
\[
x_{1}=\square x_{2}=\square \int_{x_{1}}^{x_{2}}[\square d x
\]
\[
y_{1}=\square y_{2}=\square \int_{y_{1}}^{y_{2}}[\square] d y
\]

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Let the region R be the area enclosed the function f(x)=√(x)-1, the horizontal line y=1, and the y-axis. Write an integral in terms of x and also an integral in terms of y that would represent the area of the region R . If necessary, round limit values to the nearest thousandth.

Answer Attempt 1 out of 2

x1=□ x2=□∫x1^x2[□ d x

y1=□ y2=□∫y1^y2[□] d y

Added by Karen F.

University Calculus: Early Transcendentals

Joel Hass, Christopher Heil, Przemyslaw… 4th Edition

Chapter 14

Instant Answer

Solved by Expert Finn Hittson

07/07/2020

Step 1

- The function is \( f(x) = \sqrt{x} - 1 \). - The horizontal line is \( y = 1 \). - The vertical boundary is the \( y \)-axis, which is \( x = 0 \). Show more…

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Question Watch Video Show Examples Let the region R be the area enclosed the function \( f(x)=\sqrt{x}-1 \), the horizontal line \( y=1 \), and the \( y \)-axis. Write an integral in terms of \( x \) and also an integral in terms of \( y \) that would represent the area of the region R . If necessary, round limit values to the nearest thousandth. Answer Attempt 1 out of 2 \[ x_{1}=\square x_{2}=\square \int_{x_{1}}^{x_{2}}[\square d x \] \[ y_{1}=\square y_{2}=\square \int_{y_{1}}^{y_{2}}[\square] d y \]

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