00:01
Hello everyone, according to the question the given term is f double dash x is equal to 7 divided by 8 x to the power 7 divided by 8 and now find the f of x from the f double dash x then how to find out the f double dash x to f x then integrate the f of dash x so now integrate the f dash x is equal to integral of f double x d x plus c and the c is the constant of integration.
00:34
C is the constant.
00:36
Then put the f double -diss x terms in the f -dicex, then 7 divided by 8, x to the power 7 divided by 8 dx plus c.
00:47
Now we know that 7 divided by 8 is the constant term, then it comes out from the integral, then x to the power 7 divided by 8 dx plus c.
00:57
And simply x to the power 7 by 8 integration now that integral of x to the power n d x is equal to x to the power n divided by n plus 1 plus a a is the constant of integration then this terminology is used in this part then simply 7 divided by 8 x to the power 7 divided by 8 plus 1 divided by 7 divided by 8 plus 1 plus c and now this part of the integration we will solve this, the f -diss x is equal to 7 divided by 15, x to the power, 15 divided by 8 plus c.
01:36
Then this is the f -d -x term.
01:38
Now we solve the f -x.
01:40
So how to f -x to get to the f -x? then, now integrate f -da -x.
01:48
Then f -of -x is equal to integral of f -d -x dx plus d...