A 1500 kgkg steel beam is supported by the two ropes shown in (Figure 1). Calculate the tension in the rope. The rope can support a maximum tension of 8300. Is this rope strong enough to do the job? Choose the correct answer and explanation. No. The tension in the ropes exceeds the maximum value, the ropes will break. Yes. The tension in the ropes exceeds the maximum value, but since we have two ropes they can support the beam without being broken. Yes. The tension in the ropes does not exceed the maximum value, the ropes will not break. No. The tension in the ropes does not exceed the maximum value, but since the ropes are not vertical the actual maximum tension they can support is lower and they will break.

A 1500 kgkg steel beam is supported by the two ropes shown in (Figure 1). Calculate the tension in the rope. The rope can support a maximum tension of 8300. Is this rope strong enough to do the job? Choose the correct answer and explanation. No. The tension in the ropes exceeds the maximum value, the ropes will break. Yes. The tension in the ropes exceeds the maximum value, but since we have two ropes they can support the beam without being broken. Yes. The tension in the ropes does not exceed the maximum value, the ropes will not break. No. The tension in the ropes does not exceed the maximum value, but since the ropes are not vertical the actual maximum tension they can support is lower and they will break.

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Question

No. The tension in the ropes exceeds the maximum value, the ropes will break.

Yes. The tension in the ropes exceeds the maximum value, but since we have two ropes they can support the beam without being broken.

Yes. The tension in the ropes does not exceed the maximum value, the ropes will not break.

No. The tension in the ropes does not exceed the maximum value, but since the ropes are not vertical the actual maximum tension they can support is lower and they will break.

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