Two oranges, three bananas and four apples cost ₹ 15. Three oranges, two bananas and one apple cost ₹ 10. How much will I pay for 3 oranges, 3 bananas and 3 apples?

Question

If \( a, b, c \) are all positive integers, with \( 4a>b \), then which of the following conditions is BOTH NECESSARY AND SUFFICIENT for the expression \[ \sqrt{(3)^a (21)^{3a-b} (49)^{2b+c}} \] to be a positive integer?

Answer 1

Step 1: Define equations
Let orange \(=O\), banana \(=B\), apple \(=A\).
Equation (1): \(2O+3B+4A=15\).
Equation (2): \(3O+2B+A=10\).
Step 2: Target expression
We need \(3O+3B+3A\).
Step 3: Equation manipulation
Multiply (2) by 3: \(9O+6B+3A=30\).
Multiply (1) by 3: \(6O+9B+12A=45\).
Subtract the second from the first: \((9O-6O)+(6B-9B)+(3A-12A)=30-45\).
\(\Rightarrow 3O-3B-9A=-15 \ \(\Rightarrow\) O-B-3A=-5\).
This relation, with the originals, allows solving for \(3O+3B+3A\). Add Eqn (1) and Eqn (2): \((2O+3O)+(3B+2B)+(4A+A)=15+10\).
\(\Rightarrow 5O+5B+5A=25 \(\Rightarrow\) O+B+A=5\).
So \(3O+3B+3A=15\).
\[ \boxed{₹ 15} \]

Two oranges, three bananas and four apples cost ₹ 15. Three oranges, two bananas and one apple cost ₹ 10. How much will I pay for 3 oranges, 3 bananas and 3 apples?

Show Hint

The Correct Option is D

Solution and Explanation

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