Math, asked by Anonymous, 8 months ago

The largest no. which divides 70 and 125, leaving remainders 5 and 8, respectively, is ​

Answers

Answered by Anonymous
27

ur answer is 13

EXPLANATION:

Since 5 and 8 are the remainders of 70 and 125, respectively. Thus after subtracting these remainders from the numbers, we have the numbers

Since 5 and 8 are the remainders of 70 and 125, respectively. Thus after subtracting these remainders from the numbers, we have the numbers65 = (70 − 5), 117 = (125 − 8) which is divisible by the required number.

Since 5 and 8 are the remainders of 70 and 125, respectively. Thus after subtracting these remainders from the numbers, we have the numbers65 = (70 − 5), 117 = (125 − 8) which is divisible by the required number.Now required number = H.C.F of (65,117)

Answered by Anonymous
12

GIVEN:-

The largest number which divides 70 and 125, leaving remainders 5 and 8, respectively.

FIND:-

What is the number = ?

SOLUTION:-

Here,

when the number divides 70 leaves remainder as 5. So, 70-5 = 65

and

when the number divides 125 leaves remainder as 8. So, 125 - 8 = 117

Now, let us find the HCF of 65 and 117.

Since, 117>65

 \tt \therefore117 = 65 \times 1 + 52

 \tt \implies65 = 52 \times 1 + 13

 \tt \implies 52  = 13\times 4 + 0

Hence, remainder is become 0.

Thus, 13 is the HCF of 65 and 117.

Hence, \boxed{\tt13} is the required no. which divides 70 and 125 leaving remainder 5 and 8 respectively.

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