Integral of y=sqrt.(x^2+a^2) or y^2=x^2+a^2

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In summary, to integrate y=sqrt.(x^2+a^2), you can substitute x=a \sinh u or x=\tan u, depending on your familiarity with hyperbolic functions, and then use the trigonometric identity cosh^2 u-\sinh^2 u=1 or the Pythagorean identity sin^2(u)+ cos^2(u)= 1 to manipulate the integral into a more manageable form.
  • #1
3hlang
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how do you integrate this...
y=sqrt.(x^2+a^2)

would greatly appreciate any help. thanks
 
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  • #2
Easiest way to do this is to make the the substitution [itex]x=a \sinh u[/itex]. Note that [itex]\cosh^2 u-\sinh^2 u=1[/itex]. Try it out! If you're totally unfamiliar with hyperbolic functions use [itex]x=\tan u[/itex] instead.
 
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  • #3
would i be right in thinking that cosh(x)=cos(ix) and sinh(x)=-isin(ix) and therefore
cosh(x)+sinh(x)=e^x?
 
  • #4
Yes that's correct, although I don't see how this is relevant to your problem.
 
  • #5
Since [itex]sin^2(u)+ cos^2(u)= 1[/itex] leads to [itex]tan^2(u)+ 1= sec^2(u)[/itex] (divide both sides by [itex]cos^2(u)[/itex]), you could also make the substitution ax= tan(u).
 

1. What is the meaning of the integral of y=sqrt.(x^2+a^2)?

The integral of y=sqrt.(x^2+a^2) is the area under the curve of the function, y=sqrt.(x^2+a^2), between two given points on the x-axis.

2. How do you calculate the integral of y=sqrt.(x^2+a^2)?

To calculate the integral of y=sqrt.(x^2+a^2), you can use the substitution method or the trigonometric substitution method. You can also use a table of integrals to find the integral of this function.

3. What is the relationship between the integral of y=sqrt.(x^2+a^2) and the function y^2=x^2+a^2?

The integral of y=sqrt.(x^2+a^2) is the antiderivative of the function y^2=x^2+a^2. This means that the derivative of the integral of y=sqrt.(x^2+a^2) is equal to the function y^2=x^2+a^2.

4. How is the integral of y=sqrt.(x^2+a^2) used in real life?

The integral of y=sqrt.(x^2+a^2) is used in various fields of science and engineering, such as physics, engineering, and economics. It is used to calculate quantities such as displacement, velocity, and acceleration in real-life scenarios.

5. Can the integral of y=sqrt.(x^2+a^2) be solved analytically?

Yes, the integral of y=sqrt.(x^2+a^2) can be solved analytically using various methods such as substitution, trigonometric substitution, and integration by parts. However, some integrals may require the use of numerical methods to find an approximate solution.

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