First, I determine what trigonometric function (sine, cosine, or tangent) relates the angle and side I do know to the side whose length I need to solve for. To do this, I consider how the two triangle sides are related to the angle I’m given. I will denote the angle as ∠WYX. 

Segment XY, which is 5 cm long, is adjacent to ∠WYX. Segment WY can also be considered to be adjacent, but I know from the fact that it is opposite the right angle that it must be the hypotenuse – the longest side of the triangle. This means that I’m relating the adjacent side to the angle and the hypotenuse. The trigonometric function that deals with this is cosine, so I’ll use that to set up an equation to solve for A.

The length of segment XY is 5 cm, and the length of segment WY is A cm.

The cosine of ∠WYX can be expressed as follows:

cos(52˚) = 5/A

Now, I solve for A:

cos(52˚) = 5/A

cos(52˚) • A = 5

A = 5/cos(52˚)

I can plug the expression 5/cos(52˚) into my calculator to get the approximate answer for A. 

As always, I make sure that my calculator is in degree mode, not radian mode (since I’m dealing with degrees).

From the calculator I find that:

A ≈ 8.121 ≈ 8.1 

Rounded to the nearest tenth, the length of segment WY is 8.1 cm.

I check my answer by finding the ratio of 5 to 8.1. It should approximate cos(52˚).

cos(52˚) ≈ 0.62

5/8.1 ≈ 0.62

I got the answer right.

This particular triangle set-up doesn’t require me to use a calculator to solve for the sine and cosine of ∠ABC, because I recognize that this is a special 30-60-90 triangle.

Given that the length of the hypotenuse is 1 m, I can determine by the special side length ratios that the length of segment CA (opposite ∠ABC) is 1/2 m, or 0.5 m, and the length of segment AB (adjacent ∠ABC) is √3/2 m, which is about 0.87 m. 

Knowing the lengths for segments CA and AB makes it easy for me to now determine the sine and cosine of ∠ABC:

sin(∠ABC) = sin(30˚) = (½)/1 = ½

cos(∠ABC) = cos(30˚) = (√3/2)/1 = √3/2

The tangent of a general angle is defined as:

tan(𝜃) = sin(𝜃)/cos(𝜃)

So for ∠ABC:

tan(∠ABC) = sin(∠ABC)/cos(∠ABC)

I know that sin(∠ABC) = ½ and cos(∠ABC) = √3/2, so the result becomes:

tan(∠ABC) = (1/2)/(√3/2) = 1/2 • 2/√3 = 1/√3 = √3/3

The tangent of ∠ABC is √3/3.

I’ll check that tan(∠ABC) = √3/3 by evaluating tan(30˚) directly on my calculator (in degree mode) and comparing that to √3/3.

√3/3 ≈ 0.577

tan(30˚) ≈ 0.577 = √3/3

The results are actually equal to each other, so I got the answer right.