# Integral .Solve the integral f(x)=lnx .

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The integral of f(x) = ln x can be found using integration by parts which gives.

Int[u dv] = u*v - Int[v du]

Let u = ln x, du = 1/x

dv = 1, v = x

Int[ ln x] = x*ln x - Int [ x/x dx]

=> x*ln x - x + C

**The integral of ln x is x*ln x - x + C**

For solving the integral, we'll apply integration by parts:

Int f(x)dx = Int ln xdx

We'll apply the formula of integration by parts:

Int udv = uv - Int vdu

u = ln x

We'll differentiate both sides:

du = dx/x

dv = dx => Int dx = Int dv = v

v = x

We'll substitute u,v,du,dv in the formula above:

Int ln xdx = x*ln x - Int xdx/x

We'll simplify and we'll get:

Int ln xdx = x*ln x - Int dx

Int ln xdx = x*ln x - x + C

We'll factorize by x:

**Int ln xdx = x(ln x - 1) + C**