Differentiate the following functions with respect to x:
Let, y = 
We have to find dy/dx
As we can observe that y is a fraction of two functions say u and v where,
u = x + ex and v = 1 + log x
∴ y = u/v
As we know that to find the derivative of fraction of two function we apply quotient rule of differentiation.
By quotient rule, we have –
…equation 1
As, u = x + ex
∴ 
∵ 
, so we get –
⇒ 
…equation 2
As, v = 1 + log x
⇒ 
…equation 3 {∵ 
}
∴ from equation 1, we can find dy/dx
∴ 
⇒ 
{using equation 2 and 3}
⇒ 
⇒ 
Hence,
3