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Question
line segment jl is an altitude in triangle jkm. which statement explains whether jkm is a right triangle? round measures to the nearest tenth. \bigcirc jkm is a right triangle because kl + lm = 15.3. \bigcirc jkm is a right triangle because kl + lm = 18.2. \bigcirc jkm is not a right triangle because kl + lm \
eq 15.3. \bigcirc jkm is not a right triangle because kl + lm \
eq 18.2.
Step1: Calculate KL via Pythagoras
In right $\triangle JKL$:
$$KL = \sqrt{JK^2 - JL^2} = \sqrt{13^2 - 5^2}$$
$$KL = \sqrt{169 - 25} = \sqrt{144} = 12$$
Step2: Calculate LM via Pythagoras
In right $\triangle JLM$:
$$LM = \sqrt{JM^2 - JL^2} = \sqrt{8^2 - 5^2}$$
$$LM = \sqrt{64 - 25} = \sqrt{39} \approx 6.2$$
Step3: Sum KL and LM
$$KL + LM = 12 + 6.2 = 18.2$$
Step4: Verify right triangle condition
If $\triangle JKM$ were right-angled at $K$, $KM$ would equal $\sqrt{JK^2 + JM^2} = \sqrt{13^2 + 8^2} = \sqrt{233} \approx 15.3$. Since $KL+LM=18.2
eq 15.3$, $\triangle JKM$ is not right-angled.
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JKM is not a right triangle because $KL + LM
eq 15.3$