Question

If the income of A B and C is in the ratio of 2:5:11 and the income of B is 291 more than that of A then the income of C is

Answer 1

Answer:

Income of C is 1067 $.

Given :

• Ratio of income = 2:5:11
• Income of B = 291 + income of A

To find :

• Income of C

Solution :

Let the common ratio be x .

• Then income of A = 2x
• income of B = 5x
• income of C = 11x

Given , income of B = 291 + income of A

5x = 291 + 2x

5x -2x = 291

3x = 291

x = 291/3

x = 97

Income of A = 2 × 97 = 194

Income of B = 5 × 97 = 485

Income of C = 11 × 97 = 1067

$\underline{\therefore \sf Income\ of\ C\ is\ 1067}$

Answer 2

Answer:

The income of C is 1067.

Step-by-step explanation:

Let's use the given information to form a system of equations that we can use to solve for the incomes of A, B, and C.

Let A's income be 2x.

Let B's income be 5x.

Let C's income be 11x.

We know that B's income is 291 more than A's income, so we can write:

5x = 2x + 291

Solving for x, we get:

x = 97

Now we can use this value of x to find the incomes of A, B, and C:

A's income = 2x = 2(97) = 194

B's income = 5x = 5(97) = 485

C's income = 11x = 11(97) = 1067

Therefore, the income of C is 1067.

To learn more about ratio: https://brainly.com/question/2328454

To learn more about system of equations: https://brainly.com/question/13729904

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