Answer:
(180)
Step-by-step explanation:
Hint: Here, we will find the smallest and largest 3-digit number divisible by 9. We will use the formula for the nth
term of an arithmetic progression. Then, we will take the required smallest 3-digit number as the first term, the required largest 3-digit number as the last term and 9 as the common difference of the A.P. We will find the number of terms of the A.P. and the number of terms will be the number of 3-digit numbers divisible by 9.
Formulas used: We will use the formula, l=a+(n−1)d
where l
is the last term, d
is the common difference and n
is the total number of terms in an A.P.
Complete step-by-step answer:
We know that the divisibility rule of 9 is given as: if the sum of digits of a number is divisible by 9, the number is also divisible by 9.
Let’s go through the multiples of 9 and find the smallest 3-digit number that is a multiple of 9.
We know that
9×11=999×12=108
We have found that 108 is the smallest 3-digit number that is divisible by 9.
