Let y=f(x) be drawn with f(0)=2 and for each real number ' a ' the line tangent to y=f(x) at (a, f(a)), has x-intercept (a-2). If f(x) is of the form of k ep x, then ((k/p)) has the value equal to

Question

Let y=f(x) be drawn with f(0)=2 and for each real number ' a ' the line tangent to y=f(x) at (a, f(a)), has x-intercept (a-2). If f(x) is of the form of k ep x, then ((k/p)) has the value equal to (A)  (B)  (C)  (D)

Tardigrade Admin · Accepted Answer

We have f(0)=2 Now y-f(a)=f'(a)[x-a] For x-intercept y=0, so x=a-(f(a)/f'(a))=a-2 ⇒ (f(a)/f'(a))=2 ⇒ (f'(a)/f(a))=(1/2) ∴ On integrating both sides w.r.t. a, we get ln f(a)=(a/2)+C f(a)=C ea / 2 f(x)=C ex / 2 f(0)=C ⇒ C=2 ∴ f(x)=2 ex / 2 Hence k=2, p=(1/2) ⇒ (k/p)=4

Q. Let y=f(x) be drawn with f(0)=2 and for each real number ' a ' the line tangent to y=f(x) at (a,f(a)), has x-intercept (a−2). If f(x) is of the form of kepx, then (pk​) has the value equal to

We have f(0)=2 Now y−f(a)=f′(a)[x−a] For x-intercept y=0, so x=a−f′(a)f(a)​=a−2 ⇒f′(a)f(a)​=2 ⇒f(a)f′(a)​=21​ ∴ On integrating both sides w.r.t. a, we get lnf(a)=2a​+C f(a)=Cea/2 f(x)=Cex/2 f(0)=C ⇒C=2 ∴f(x)=2ex/2 Hence k=2,p=21​ ⇒pk​=4

Q. Let $y = f (x)$ be drawn with $f (0) = 2$ and for each real number ' $a$ ' the line tangent to $y = f (x)$ at $(a, f (a))$ , has $x$ -intercept $(a - 2)$ . If $f (x)$ is of the form of $k e^{p x}$ , then $(\frac{k}{p})$ has the value equal to