Question

In the natural numbers from 10 to 250, how many are divisible by 4?

(For this complete the following activity)

The natural numbers from 10 to 250 which are divisible by 4 are

12, 16, 20, ….., 248 Here a =12 and d = , tn = 248

tn = a+(n -1) x [ Formula]

248 = 12 + (n-1) x


∴ 248 = 8 + n

∴ n=



∴ There are numbers from 10 to 250 which are divisible by 4
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Answer 1

Answer:

31 numbers will be there

Answer 2

Step-by-step explanation:

$natural \: \: number \: from \: 10to \: 250 \: is \: divisible \: by \: 4$

$12. \: \: 16 \: \: \: 20 \: \: \: \: \: ....248$

$a = 12$

$d = 4$

$n =$

$a + (n - 1) \times d$

$12 + (n - 1) \times 4 = 248$

$12 + (4n - 4) = 248$

$4n - 4 = 248 - 12$

$4n = 236 + 4$

$4n = 240$

$n = \frac{240}{4} = 60$

n=60. answer