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Question 120
If x and y are positive real numbers and xy = 8, then the minimum value of 2x + y is
Solution
As $$x$$ & $$y$$ are positive real numbers, we can use AM $$\geq$$ GM
Let two numbers be $$2x$$ and $$y$$
=> $$\frac{2x + y}{2} \geq \sqrt{2xy}$$
=> $$2x + y \geq 2\sqrt{16}$$
=> $$2x + y \geq 8$$
=> Minimum value of $$(2x + y)$$ is 8
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