How many numbers are there between 1 and 1000 which when divided by 7 leave remainder 4?

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Solution

A number N is divided by 7 leaves a remainder 4.

∴ N = 7q + 4

N can take values 4, 11, 18, ..... 998

Now,
4, 11, 18, ..... 998 are in arithmetic progression.
First term a = 4
common difference d = 7
last term l = 998

We know that,
l = a + (n − 1)d
⇒ 998 = 4 + (n − 1)7
⇒ 998 = 4 + 7n − 7
⇒ 998 = 7n − 3
⇒ 1001 = 7n
⇒ $n = \frac{1001}{7}$
⇒ n = 143

Hence, 143 numbers are there between 1 and 1000 which when divided by 7 leave remainder 4.

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