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Chapter 10: Problem 51

If one of the acute angles of a right triangle is \(37^{\circ}\), explain why the sine ratio does not increase as the size of the triangle increases.

Short Answer

Expert verified
The sine ratio does not increase as the size of the triangle increases because it is defined by the angles, not the side lengths. So even as the triangle gets bigger, the ratio of opposite side to hypotenuse remains the same, which means the sine of \(37^{\circ}\) will also remain unchanged.

Step by step solution

01

Understand the sine ratio

The sine ratio for an angle in a right triangle is defined as the ratio of the length of the side opposite the angle to the length of the hypotenuse. Mathematically, Sin(x) = Opposite side / Hypotenuse.
02

Understand the constant nature of sine ratio

It's important to note that the sine ratio is defined based on the angles, not the actual lengths of the sides. Therefore, regardless of how large or small the triangle is (i.e., the lengths of the sides), the sine ratio for a given angle remains the same.
03

Apply this understanding to the question

In this exercise, the acute angle given is \(37^{\circ}\). Regardless of how much the triangle increases in size, the length ratios will remain the same. So the sine ratio, Sin(37^{\circ}\), does not increase as the size of the triangle increases. This is the concept of similarity in triangles.
04

Find Sin(37^{\circ}\)

In most cases, you would need to use a calculator or table to find the precise value of Sin(37^{\circ}\). But it's important to remember, the exact value doesn't matter for answering this exercise. The key concept to understand is that Sin(37^{\circ}\) is a fixed value, and doesn't change as the size of the triangle changes.

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Most popular questions from this chapter

The Statue of Liberty is approximately 305 feet tall. If the angle of elevation of a ship to the top of the statue is \(23.7^{\circ}\), how far, to the nearest foot, is the ship from the statue's base?

Use a calculator to find each of the following: \(\sin 32^{\circ}\) and \(\cos 58^{\circ} ; \sin 17^{\circ}\) and \(\cos 73^{\circ} ; \sin 50^{\circ}\) and \(\cos 40^{\circ} ; \sin 88^{\circ}\) and \(\cos 2^{\circ}\). Describe what you observe. Based on your observations, what do you think the co in cosine stands for?

From a point on level ground 30 yards from the base of a building, the angle of elevation to the top of the building is \(38.7^{\circ}\). Approximate the height of the building to the nearest foot.

Describe how to identify the corresponding sides in similar triangles.

Albert Einstein's theory of general relativity is concerned with the structure, or the geometry, of the universe. In order to describe the universe, Einstein discovered that he needed four variables: three variables to locate an object in space and a fourth variable describing time. This system is known as space-time. Because we are three-dimensional beings, how can we imagine four dimensions? One interesting approach to visualizing four dimensions is to consider an analogy of a twodimensional being struggling to understand three dimensions. This approach first appeared in a book called Flatland by Edwin Abbott, written around \(1884 .\) Flatland describes an entire civilization of beings who are two dimensional, living on a flat plane, unaware of the existence of anything outside their universe. A house in Flatland would look like a blueprint or a line drawing to us. If we were to draw a closed circle around Flatlanders, they would be imprisoned in a cell with no way to see out or escape because there is no way to move up and over the circle. For a two-dimensional being moving only on a plane, the idea of up would be incomprehensible. We could explain that up means moving in a new direction, perpendicular to the two dimensions they know, but it would be similar to telling us we can move in the fourth dimension by traveling perpendicular to our three dimensions. Group members should obtain copies of or excerpts from Edwin Abbott's Flatland. We especially recommend The Annotated Flatland, Perseus Publishing, 2002, with fascinating commentary by mathematician and author Ian Stewart. Once all group members have read the story, the following questions are offered for group discussion. a. How does the sphere, the visitor from the third dimension, reflect the same narrow perspective as the Flatlanders? b. What are some of the sociological problems raised in the story? c. What happens when we have a certain way of seeing the world that is challenged by coming into contact with something quite different? Be as specific as possible, citing either personal examples or historical examples. d. How are A. Square's difficulties in visualizing three dimensions similar to those of a three-dimensional dweller trying to visualize four dimensions? e. How does the author reflect the overt sexism of his time? f. What "upward not northward" ideas do you hold that, if shared, would result in criticism, rejection, or a fate similar to that of the narrator of Flatland?
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