Let f: R arrow R be a continuous function. Then displaystyle lim x arrow (π/4) ((π/4) ∫ limits2 sec 2 x f(x) d x/x2-(π2)16) is equal to:

Question

Let f: R arrow R be a continuous function. Then displaystyle lim x arrow (π/4) ((π/4) ∫ limits2 sec 2 x f(x) d x/x2-(π2)16) is equal to: (A) f(2) (B) 2 f(2) (C) 2 f(√2) (D) 4 f(2)

Tardigrade Admin · Accepted Answer

displaystyle lim x arrow (π/4) ((π/4) ∫ limits2 sec 2 x f(x) d x/x2-(π2)16) displaystyle lim x arrow (π/4) (π/4) ⋅ (. f ( sec 2 x ) ⋅ 2 sec x ⋅ sec x tan x ]/2 x ) displaystyle lim x arrow (π/4) (π/4) f ( sec 2 x ) ⋅ sec 3 x ⋅ ( sin x / x ) (π/4) f (2) ⋅(√2)3 ⋅ (1/√2) × (4/π) ⇒ 2 f (2)

Q. Let $f : R \to R$ be a continuous function. Then $x \to \frac{π}{4} lim \frac{\frac{π}{4} 2 \int s e c ^{2} x f ( x ) d x}{x ^{2} - \frac{π ^{2}}{16}}$ is equal to:

$f (2)$

$2 f (2)$

$2 f (2)$

$4 f (2)$

Q. Let f:R→R be a continuous function. Then x→4π​lim​x2−16π2​4π​2∫sec2x​f(x)dx​ is equal to:

f(2)

2f(2)

2f(2​)

4f(2)

x→4π​lim​x2−16π2​4π​2∫sec2x​f(x)dx​ x→4π​lim​4π​⋅2xf(sec2x)⋅2secx⋅secxtanx]​ x→4π​lim​4π​f(sec2x)⋅sec3x⋅xsinx​ 4π​f(2)⋅(2​)3⋅2​1​×π4​ ⇒2f(2)

Q. Let $f : R \to R$ be a continuous function. Then $x \to \frac{π}{4} lim \frac{\frac{π}{4} 2 \int s e c ^{2} x f ( x ) d x}{x ^{2} - \frac{π ^{2}}{16}}$ is equal to:

$f (2)$

$2 f (2)$

$2 f (2)$

$4 f (2)$