y=5^(-1/x)
Please write some explanation so i can understand and learn how to do.
+23247 There is a formula that says: d(a^u)/dx = a^u·ln(a)·du/dx
(If you don't have this formula, then we'll have to go back to more basic formulas.)
(Assumes: a>0 and u is a differentiable function of x. The inclusion of du/dx makes it a chain rule problem.)
For your problem, a = 5, u = -1/x.
--> a^u = 5^(-1/x)
--> ln(a) = ln(5)
--> du/dx = d(-1/x)/dx = d(-x^-1)/dx = x^-2
y' = 5^(-1/x) · ln(5) · (x^-2)
+23247 There is a formula that says: d(a^u)/dx = a^u·ln(a)·du/dx
(If you don't have this formula, then we'll have to go back to more basic formulas.)
(Assumes: a>0 and u is a differentiable function of x. The inclusion of du/dx makes it a chain rule problem.)
For your problem, a = 5, u = -1/x.
--> a^u = 5^(-1/x)
--> ln(a) = ln(5)
--> du/dx = d(-1/x)/dx = d(-x^-1)/dx = x^-2
y' = 5^(-1/x) · ln(5) · (x^-2)
