Question

find the maximum number of girls among whom 1633 mangoes and 1207 oranges can be equally distributed?

Answer 1

The number of girls among whom “1633 mangoes and 1207 oranges” will be equally distributed are 71.

Solution:

Given:  1633 mangoes and 1207 oranges to be equally distributed.

We are to find out the number of girls among whom 1633 mangoes and 1207 oranges will be equally distributed.

To find these, we need to take H.C.F. of 1633 and 1207.

$\bold{1633=23 \times 71}$

$\bold{1207=17 \times 71}$

Accordingly, the Highest common factor of 1633 and 1207 is 71 which means  that the number of girls among whom 1633 mangoes and 1207 oranges will be equally distributed are 71.

Answer 2

There are 71 girls among whom 1633 mangoes and 1207 oranges can be equally distributed

Step-by-step explanation:

Given data

Number of mangoes = 1633

Number of Oranges = 1207

Find the maximum number of girls among whose the above mentioned mangoes and oranges can be equally distributed

Take HCF for number of mangoes and oranges

HCF of 1633 = 23 × 71

HCF of 1207 = 17 × 71

The highest common factor among 1600 and 1207 is 71

If the number of girls are 71 , then each girl will get 23 mangoes and 17 oranges from 1633 mangoes and 1207 oranges.

Therefore, 1633 mangoes and 1207 oranges can equally distributed to 71 girls.

To Learn More ...

1)  The hcf of two number is 4 and the two other factors of LCM are 5 and 7 find the smaller of two numbers ​

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