Use a table of trigonometric values to find the angle è in the right triangle in the following problem. Round to the nearest degree, if necessary.

cos è = 0.8192 A = 45 H =?

Why did the angle go to the party? To find its cosine partner, of course! Now, let's grab our trusty table of trigonometric values and see what we can find. Given that cos è = 0.8192, we're looking for the corresponding angle. Checking our table, we find that the closest value for cos è is 0.8200, which corresponds to an angle of approximately 36 degrees. So, in this right triangle with angle A = 45, the angle è is around 36 degrees.

To find the angle è in the right triangle, we can use the inverse cosine function (arccos) and the given value of the cosine.

Given: cos è = 0.8192

Using a table of trigonometric values or a calculator, we can find the arccos(0.8192) ≈ 35.54 degrees.

Therefore, the angle è in the right triangle is approximately 35.54 degrees.

To find the angle è in the right triangle, we need to use the inverse cosine function. However, before doing that, we need to find the value of the adjacent side, which we'll call H.

Given that cos è = 0.8192, we can use the inverse cosine function to find the angle è. The inverse cosine function, denoted as acos(), returns the arc cosine value for a given input.

First, use the inverse cosine function:
acos(0.8192) = 34.1526 degrees.

This is the angle è in decimal degrees. However, the question asks us to round the answer to the nearest degree.

Rounding 34.1526 to the nearest degree gives us 34 degrees.

Thus, the value of angle è in the right triangle is approximately 34 degrees.

There should be a figure or description of what angle or side goes where. If one of the acute angles of the right triangle is

è = cos^-1 0.8192 = 35.0 degrees, the other acute angle is 55.0 degrees.

I have no clue where A andH are located