There are two separate issues in your question, I will cover each.

Here's an ASCII picture of your situation:

B
+
/|
/ |
/ |
/ |
len / | y
/ |
/ |
/ |
/ __|
/ θ | |
+----------+
A x C

This is a right triangle. It has three sides:

- The diagonal side in the picture opposite to the 90° angle is called the hypotenuse and has a length
`len`

. The hypotenuse is what you're trying to draw.
- The vertical side is the side opposite to the angle
`θ`

and has a length `y`

.
- The horizontal side is the side adjacent to the angle
`θ`

and has a length `x`

.

Given the above illustration the following equations are true:

```
cos(θ) = x/len
sin(θ) = y/len
```

These equations are another way of saying:

- The cosine of an angle is equal to the length of the adjacent side divided by the length of the hypotenuse.
- The sine of an angle is equal to the length of the opposite side divided by the length of the hypotenuse.

When solving the equation for `x`

and `y`

, you get:

```
x = len * cos(θ)
y = len * sin(θ)
```

So you want `sin()`

and `cos()`

, not `cos()`

and `tan()`

. If the point `A`

is not at the origin, you would need to offset `x`

and `y`

by addition, like so:

```
x = len * cos(θ) + 50
y = len * sin(θ) + 50
```

With the values for `x`

and `y`

, you can find the coordinates for point `B`

on the triangle, and thus be able to draw your lines.

Also, assuming you're programming in Java, the trigonometric functions in the `Math`

class expect the angle in radians, not degrees. Lots of programming languages that provides trigonometric functions are like this.

Radians and degrees measure the same thing, but a complete rotation in degrees goes from `0`

to `360°`

while a complete rotation in radians go from `0`

to `2π`

.

To convert angles in degrees to radians, multiply the angle by `π/180`

. In Java, the constant `π`

is provided by `Math.PI`

.

For example, an angle of 10° degrees is equivalent to `10 * π/180`

, or `π/18`

radians.