What is the area of the region in the first quadrant enclosed by the graphs of y = cosx, y= x, and the y -axis?

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What is the area of the region in the first quadrant enclosed by the graphs of y = cosx, y= x, and the y -axis?

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Answer 1 · 2017-02-26T02:37:26

$A = 0.401 u^{2}$ $A = 0.401u^2$

Explanation:

To find the area between two curves, find the integral of the difference between the two functions over the desired interval.

That is a mouthful, so it is probably best to explain using a graph:
enter image source here

We are looking for the purple area between these two curves. First, let's figure out where $y = cos (x)$ $y = cos(x)$ and $y = x$ $y = x$ intersect.

Unfortunately, there is not an easy way to find the intersection of these two functions by hand. Using a graphing calculator, it can be seen that $y = cos (x)$ $y=cos(x)$ and $y = x$ $y=x$ intersect at (0.739, 0.739).

Now, let's integrate:

Function 1:
$\int_{0}^{0.739} cos (x) d x = sin (0.739) - sin (0) = 0.674 - 0 = 0.674$ $int_0^0.739 cos(x)dx = sin(0.739) - sin(0) = 0.674-0=0.674$

enter image source here

Function 2:
$\int_{0}^{0.739} x d x = \frac{{(0.739)}^{2}}{2} - \frac{{(0)}^{2}}{2} = 0.273$ $int_0^0.739 xdx = (0.739)^2/2 - (0)^2/2=0.273$

enter image source here

Combining the two, we get that the area between $y = cos (x)$ $y=cos(x)$ and $y = x$ $y=x$ bounded by the y-axis is:

$A = 0.674 - 0.273 = 0.401$ $A=0.674-0.273=0.401$

Graphically, we can see this as what is shown at the beginning.

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What is the area of the region in the first quadrant enclosed by the graphs of y = cosx, y= x, and the y -axis?

1 Answer

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