To solve the problem, we can visualize the situation as a right triangle formed by the south and east movements.
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Calculate the straight-line distance (hypotenuse) from Point A to Point C using the Pythagorean theorem: \[ \text{Distance} = \sqrt{(34 \text{ m})^2 + (41 \text{ m})^2} \]
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Perform the calculations: \[ = \sqrt{1156 + 1681} \] \[ = \sqrt{2837} \] \[ \approx 53.24 \text{ m} \]
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Now calculate the total distance walked around the pond: \[ \text{Total walked distance} = 34 \text{ m} + 41 \text{ m} = 75 \text{ m} \]
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Determine the distance saved if walking directly through the pond: \[ \text{Distance saved} = \text{Total walked distance} - \text{Straight-line distance} \] \[ = 75 \text{ m} - 53.24 \text{ m} \approx 21.76 \text{ m} \]
Thus, the distance saved by walking directly through the pond would be approximately 21.76 meters.