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Jim is designing a seesaw for a children's park. The seesaw should make an angle of 30° with the ground, and the maximum height to which it should rise is 1 meter, as shown below:

A seesaw is shown with one end on the ground and the other in the air. The seesaw makes an angle of 30 degrees with the ground. The height of the seesaw from the ground, at the other end, is labeled 1 meter.

What is the maximum length of the seesaw?

1.4 meters
2 meters
0.5 meters
1 meter

Jim is designing a seesaw for a childrens park The seesaw should make an angle of 30 with the ground and the maximum height to which it should rise is 1 meter a class=

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Based on the angle of the seesaw and the height off the ground, the maximum length of the seesaw is 2 meters.

What is the seesaw's maximum length?

This can be found as:

Sin 30° = 1 / Maximum length

Solving gives:

Sin 30° = 1 / Maximum length

Ml = 1 / Sin 30°

= 1 / 0.5

= 2 meters

Find out more on maximum length at https://brainly.com/question/24259483

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