Question

A number when divided by 100 leaves a quotient (q) and a remainder (r). how many three-digit natural numbers are there such that q + r is divisible by 11?

Answer 1

there are total 17 three digits number divisible by 11 of form q+r

Answer 2

Answer:

81.

Step-by-step explanation:

rule1: Number is divisible by 11 only when difference of

sumation of numbers at odd and even place is either 11 or 0.

e.g. 352 is divisible by 11 as (3+2) - 5 = 0

so Q+R would be divisible by 11 only when it satisfies rule1

upto 100 there are 9 numbers 11,22,33,44,55,66,77,88,99.

don't consider this...since 3 digit natural numbers are asked

From 100 to 200. Q would be 1 and reminder(R)need to be 10,

21,32,43,54,65,76,87,98 again 9 numbers.

From 200 to 100. Q would be 2 and R need to be

9,20,31,42,53,64,75,86,97 again 9 numbers.....

LIKEWISE

100 to 200----9 numbers

200 to 300----9 numbers

300 to 400----9

400 to 500----9

500 to 600----9

600 to 700----9

700 to 800-----9

800 to 900-----9

900 to 1000 ---9

so total 9x9=81 numbers.