Let f-N- R be a function satisfying the following conditions-f1-1 and f1-2f2-nfn-nn-1fn for n - 2-If f999-1K- then K equals

F(1)+2f(2)+…+nf(n)=n(n+1)f(n) for n ≥ 2 nbsp; …[1] Replacing n by n+1, we get f(1)+2f(2)+…+nf(n)+(n+1)f(n+1)=(n+1)(n+2)f(n+1) …[2] From [2] [1], we get nbsp ...

You visited us 4 times! Enjoying our articles? Unlock Full Access!

Byju's Answer

Standard XIII

Mathematics

General Tips for Choosing Function

Let f:N→ R be...

Question

Let $f : N \to R$ be a function satisfying the following conditions:
$f (1) = 1$ and $f (1) + 2 f (2) + \dots + n f (n) = n (n + 1) f (n)$ for $n \geq 2$ .
If $f (999) = \frac{1}{K}$ , then $K$ equals

999

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

1000

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

1998

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

2000

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

Open in App

Solution

The correct option is C $1998$
$f (1) + 2 f (2) + \dots + n f (n) = n (n + 1) f (n)$ for $n \geq 2$
$\dots [1]$
Replacing $n$ by $n + 1$ , we get
$f (1) + 2 f (2) + \dots + n f (n) + (n + 1) f (n + 1) = (n + 1) (n + 2) f (n + 1)$
$\dots [2]$
From $[2] - [1]$ , we get
$(n + 1) f (n + 1) = (n + 1) (n + 2) f (n + 1) - n f (n)$
$\Rightarrow f (n + 1) = (n + 2) f (n + 1) - n f (n)$
$\Rightarrow (n + 1) f (n + 1) = n f (n)$
Putting $n = 2, 3, 4, \dots,$ we get
$2 f (2) = 3 f (3) = 4 f (4) = \dots = n f (n)$
From $[1]$ ,
$f (1) + (n - 1) n f (n) = n (n + 1) f (n)$
$\Rightarrow f (1) = 2 n f (n)$
$\Rightarrow f (n) = \frac{f (1)}{2 n} = \frac{1}{2 n}$
$f (999) = \frac{1}{1998}$
$∴ K = 1998$

Suggest Corrections

Similar questions

Q. Let

f : N \to R

be a function satisfying the following conditions:

f (1) = 1

and

f (1) + 2 f (2) + \dots + n f (n) = n (n + 1) f (n)

for

n \geq 2

.
If

f (999) = \frac{1}{K}

, then

K

equals

Q. Let

f : N \to R

be a function satisfying the following conditions:

f (1) = 1

and

f (1) + 2 f (2) + \dots + n f (n) = n (n + 1) f (n)

for

n \geq 2

.
If

f (1003) = \frac{1}{K}

, then

K

equals

Q. Let f :

N \to R

be a function such that

f (1) + 2 f (2) + 3 f (3) . . . . . . . + n f (n) = n (n + 1) f (n)

, for

n \geq 2

and

f (1) = 1

then

Q. Let

f : N \to R

be a function satisfying the following conditions:

f (1) = 1

and

f (1) + 2 f (2) + \dots + n f (n) = n (n + 1) f (n)

for

n \geq 2

.
The sequence

f (2), f (3), \dots

represents

Q. Let

f : N \to R

be such that

f (1) = 1

and

f (1) + 2 f (2) + 3 f (3) + . . . + n f (n) = n (n + 1) f (n)

, for all

n \in N, n \geq 2

, where N is the set of natural numbers and R is the set of real numbers. Then , the value of

f (500)

Join BYJU'S Learning Program

Let f:N→R be a function satisfying the following conditions: f(1)=1 and f(1)+2f(2)+…+nf(n)=n(n+1)f(n) for n≥2. If f(999)=1K, then K equals

Let $f : N \to R$ be a function satisfying the following conditions:
$f (1) = 1$ and $f (1) + 2 f (2) + \dots + n f (n) = n (n + 1) f (n)$ for $n \geq 2$ .
If $f (999) = \frac{1}{K}$ , then $K$ equals