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Question
Find `dy/dx`, if y = (x)x + (a)x.
Sum
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Solution
y = xx + ax
Let u = xx
Then log u = log xx = x · log x
Differentiating both sides w.r.t. x, we get
`1/u * (du)/dx = d/dx (x *log x)`
= `x * d/dx (log x) + (log x) * d/dx (x)`
= `x xx 1/x + (log x) xx 1`
∴ `(du)/dx = u (1 + log x)`
= xx (1 + log x) ...(1)
Now, y = u + ax
∴ `dy/dx = (du)/dx + d/dx(a^x)`
= xx (1 + log x) + ax . log a
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