Question

Rs2790 is to be distributed among A,B and C in the ratio 15:10:6 how much will B get ?​

Answer 1

$\bf \: \underline{Given} :$ ↴

Rs. 2790 is to be distributed among A, B and C in the ratio of 15 : 10 : 6.

$\bf \: \underline{To \: find} :$ ↴

We have to find that how much money will B get.

$\bf \star\: \red{ \underline{So, \: Let's \: Start}} \: \star$

$\sf \: Let \: us \: assume \: that :$ ↴

$\sf \: Let \: th \: portions \: of \: \underline{A \: be \: 15x}, \: \underline{B \: be \: 10x} \: and \: \underline{C \: be \: 6x}$

$\bf \: So,$

$\sf \longrightarrow \: 15x \: + 10x \: + 6x \: =2790$

$\sf \longrightarrow \: 31x \: =2790$

$\sf \longrightarrow \: x = \dfrac{2790}{31}$

$\sf \longrightarrow \: x = 30$

$\underline{ \sf \: Now, \: we \: will \: find \: that \: how \: much \: money \: will \: B \: get. }$

$\sf \: \longrightarrow \: 10 \times 90$

$\sf \: \longrightarrow \: 900$

$\underline{ \pink{ \boxed{ \sf \: So, \: B \: will \: get \: Rs. \: 900}}}$

Answer 2

Given :

✰ Rs 2790 is to be distributed among A,B and C in the ratio 15:10:6

To Find :

✰ How much will B get.

Solution :

✰ In the question it is given Rs. 2790 are distributed among A, B and C. So, let's assume the money be y. We will add A, B and C's and total is 2790 Firstly we will find the value of y and then put the value of y in the B's Money.

Let the number be y

• A's money = 15y

• B's Money = 10y

• C's Money = 6y

➤ 15y + 10y + 6y = 2790

➤ 25y + 6y = 2790

➤ 31y = 2790

➤ y = 2790/31

➤ y = 90

B's Money = 10y

➤ 10 × 90

➤ 90

∴ B will Get Rs. 90