Difference between revisions of "Using Integration to calculate volume"

Revision as of 13:54, 23 September 2021

This time we will started to learn how to use integration to calculate volume

Now we will started with a function we will started to calculate if the function rotating 360 degrees on the x axis, and it will never leave the axis, and then it will formed a 3 dimensional axis. we will called this solid of revolution, because we obtain it by revolving a region about a line.

if we say the function is $f(x)={\sqrt {x}}$ $\int _{0}^{1}A(x)dx$

so the radius of a circle will be r and $r={\sqrt {x}}$

and we can think it as the volume is made of many disk and it will formed this volume.

So the area of the disk will be like this $A=\pi r^{2}$

$r={\sqrt {x}}$

$r^{2}=x$

so

$A=\pi {({\sqrt {x}})}^{2}$

$A(x)=\pi x$

so what we will get this

$\int _{0}^{1}\pi xdx$

so $\pi$ is a constant so we can pull it out

$\pi \int _{0}^{1}xdx$

@@ Line 1: / Line 1: @@
-This time we will start to learn how to use integration to calculate the volume.
+This time we will started to learn how to use integration to calculate volume
-Now we will start to calculate if the function rotating 360 degrees on the x-axis, and the function will never leave the x-axis, and then it will form a 3-dimensional volume. We will call this solid of revolution because we obtain it by revolving a region about a line.
+Now we will started with a function we will started to calculate if the function rotating 360 degrees on the x axis, and it will never leave the axis, and then it will formed a 3 dimensional axis. we will called this solid of revolution, because we obtain it by revolving a region about a line.
 if we say the function is
@@ Line 7: / Line 7: @@
 <math>\int_{0}^{1} A(x)dx</math>
-The radius of a circle will be r and <math> r = \sqrt x</math>
+so the radius of a circle will be r and <math> r = \sqrt x</math>
-And we can understand it as the volume is made of many disks and it will form this volume.
+and we can think it as the volume is made of many disk and it will formed this volume.
-The area of the disk will be A and<math> A = \pi r^2</math>
+So the area of the disk will be like this <math> A = \pi r^2</math>
 <math> r = \sqrt x</math>
@@ Line 17: / Line 17: @@
 <math> r^2 = x</math>
-So replaced r with <math> \sqrt x</math>
+so
 <math> A = \pi {(\sqrt x)}^2</math>
@@ Line 27: / Line 27: @@
 <math>\int_{0}^{1}\pi x dx</math>
-Because <math> \pi </math> is a constant so we can pull it out  of  the intergerl.
+so <math> \pi </math> is a constant so we can pull it out
-Then we will get.
 <math>\pi \int_{0}^{1} x dx</math>

Difference between revisions of "Using Integration to calculate volume"

Revision as of 13:54, 23 September 2021

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