How do I find the integral of #int sqrt((5-x^2))#?

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Answer 1 · 2018-08-04T16:03:13

#I=x/2sqrt(5-x^2)+5/2arcsin(x/sqrt5)+c#

Here ,

#I=intsqrt(5-x^2)*1dx#

#I=sqrt(5-x^2)int1dx-int(d/(dx)(sqrt(5-x^2))int1dx)dx#

#I=sqrt(5-x^2)xx x-int1/(2sqrt(5-x^2)) (-2x)(x)dx#

#I=xsqrt(5-x^2)-int(-x^2)/sqrt(5-x^2)dx#

#I=xsqrt(5-x^2)-int((5-x^2)-5)/sqrt(5-x^2)dx#

#I=xsqrt(5-x^2)-int(5-x^2)/sqrt(5-x^2)dx+int5/sqrt(5-x^2)dx#

#I=xsqrt(5-x^2)-intsqrt(5-x^2)dx+5int1/sqrt((sqrt5)^2-x^2)dx#

#I=xsqrt(5-x^2)-I+5arcsin(x/sqrt5)+c#

#I+I=xsqrt(5-x^2)+5arcsin(x/sqrt5)+c#

#2I=xsqrt(5-x^2)+5arcsin(x/sqrt5)+c#

#I=x/2sqrt(5-x^2)+5/2arcsin(x/sqrt5)+c#