Express each of the side lengths of triangle PQR as a square root.
Check for Reasonableness Estimate the perimeter of triangle PQR. Round to the nearest hundredth.
Expressing Side Lengths of Triangle PQR as Square Roots with Perimeter Estimation
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To express the side lengths of triangle PQR as square roots, you typically need the coordinates of the vertices or the lengths given in a specific problem. If you have those values, you’ll calculate the distance between points using the distance formula:
[ text{Distance} = sqrt{(x_2 – x_1)^2 + (y_2 – y_1)^2} ]
Once you find the lengths of the sides, you can then express them as square roots.
To estimate the perimeter, simply add the lengths of all three sides together. For example, if the side lengths were calculated to be (sqrt{a}), (sqrt{b}), and (sqrt{c}), the perimeter would be:
[ P = sqrt{a} + sqrt{b} + sqrt{c} ]
After summing these values, round your answer to the nearest hundredth.
If you provide the specific coordinates or lengths for the triangle PQR, I can help you compute the exact values! For more detailed guidance, feel free to check the extended services page.