Question

find the sum of all natural numbers between 100 to 200 divisible by 3​

Answer 1

Answer:

The “sum” of all the multiples of 3 between the numbers “100 and 200” are 4950.

Answer 2

Answer:

33,000

Step-by-step explanation:

first no. (a)= 102

last no. ( l) = 198

difference (d) = 3

To find,

total no. between 100 and 200 which is divisible by 3

l= a+(n-1) d

198= 102+(n-1)3

198-102=(n-1)3

96=3n-3

96+3=3n

99=3n

n=99÷3

n=33

therefore total no. = 33

Now,

Sum =n/2(a+l)

= 33÷2(102+198)

= 33÷2×300

=33×100

=33000 Ans.