How do you differentiate 12sqrtx+12^(3sqrtx)+12^(4sqrtx)?
2 Answers
Explanation:
All you really need to use in order to differentiate this function is the chain rule for a constant raised to a variable power.
Now, for a constant
color(blue)(a^x = e^(x * ln(a)))
This means that you can write, using th chain function for
d/dx(a^x) = d/(du)(e^u) * d/dx(u)
d/dx(a^x) = underbrace(e^(x * ln(a)))_(color(red)(=a^x)) * d/dx(x * ln(a))
color(blue)(d/dx(a^x) = a^x * ln(a))
Your function can be rewritten as
y = 12 * x^(1/2) + 12^(3 * x^(1/2)) + 12^(4 * x^(1/2))
The derivative of
d/dx(y) = [d/dx(12x^(1/2))] + [d/dx12^(3 * x^(1/2))] + d/dx(12^(4 * x^(1/2)))
As you can see, you're going to have to use the chain rule again for the last two derivatives. More specifically, you'll have
This wil get you
d/dx(12^u) = d/(du)12^u * d/dx(u)
d/dx(12^u) = 12^u * ln(12) * d/dx(3 * x^(1/2))
d/dx(12^(3x^(1/2))) = 12^(3x^(1/2)) * ln(12) * 3/2x^(-1/2)
and
d/dx(12^t) = d/(dt)12^t * d/dx(t)
d/dx(12^(4x^(1/2))) = 12^(4x^(1/2)) * ln(12) * 2 * x^(-1/2)
Plug this into your target derivative to get
y^' = 6 * x^(-1/2) + 12^(3x^(1/2)) * ln(12) * 3/2x^(-1/2) + 12^(4x^(1/2)) * ln(12) * 2 * x^(-1/2)
You can simplify this by using
y^' = x^(-1/2) * 1/2 * [12 + 3 * 12^(3x^(1/2)) * ln(12) + 4 * 12^(4x^(1/2)) * ln(12)]
Finally, you can rewrite this as
y^' = color(green)((12 + 3 * 12^(3sqrt(x)) * ln(12) + 4 * 12^(4sqrt(x)) * ln(12))/(2sqrt(x)))
For
Explanation:
I wonder if the intended question was to differentiate:
Which uses the same ideas as the other answer, but the exponents are different:
And the derivative will be:
= 12^(x^(1/2))(ln12) [1/2 x^(-1/2)] + 12^(x^(1/3))(ln12) [1/3 x^(-2/3)] + 12^(x^(1/4))(ln12) [1/4 x^(-3/4)]
= ln12/12 [ 12^(x^(1/2))6 x^(-1/2) + 12^(x^(1/3)) 4x^(-2/3) + 12^(x^(1/4)) 3 x^(-3/4)
= ln12/12[12^sqrtx 6/sqrtx + 12^root(3)x 4/root(3)x^2 + 12^root(4)x 3/root(4)x^3]
