Let f- be a differentiable function having f-2- - 6- f-2- - - 1-48 - Then x - 2lim-6-f-x-4t-3-x-2 dt equals18241236

The correct option is A 18x → 2lim∫_6^f(x)4t^3/x 2dt =x → 2lim∫_6^f(x)4t^3dt/x 2 =x → 2lim4f(x)^3/1f'(x)=4f(2)^3f'(2) =4 × (6)^3 ×1/48=18 ...

Let f:ℝ→ℝ be ...

Question

Let $f : R \to R$ be a differentiable function having $f (2) = 6, f^{'} (2) = (\frac{1}{48})$ . Then $lim x \to 2 \int_{6}^{f (x)} \frac{4 t^{3}}{x - 2} d t$ equals

Right on! Give the BNAT exam to get a 100% scholarship for BYJUS courses

No worries! We‘ve got your back. Try BYJU‘S free classes today!

Open in App

Solution

Suggest Corrections

Similar questions

f : R \to R

f (2) = 6, f^{'} (2) = (\frac{1}{48})

lim x \to 2 \int_{6}^{f (x)} \frac{4 t^{3}}{x - 2} d t

F : R \to R

f (2) = 6

f^{'} (2) = (\frac{1}{48})

lim x \to 2 \int_{6}^{f (x)} \frac{4 t^{3}}{x - 2} d t

f : R \to R

f (2) = 6,

f^{^{'}} (2) = (\frac{1}{48})

lim x \to 2 \int_{6}^{f (x)} \frac{4 t^{3}}{x - 2} d t

f : R \to R

f (2) = 6, f^{'} (2) = (\frac{1}{48})

lim x \to 2 \int_{6}^{f (x)} \frac{4 t^{3}}{x - 2} d t

f : R \to R

f (2) = 6

f^{'} (2) = \frac{1}{48} .

f (x) \int 6 4 t^{3} d t = (x - 2) g (x),

lim x \to 2 g (x)