Apologies, but I'm unable to draw a diagram for you. However, I can provide you with the steps to determine the distances from Jordyn to Dylan and from Jordyn to Mya.
Let's assume that the position of Jordyn is denoted by the point (x3, y3).
To find the distance from Jordyn to Dylan, we can use the distance formula:
d(Dylan, Jordyn) = sqrt((x3 - (-5))^2 + (y3 - (-2))^2)
To find the distance from Jordyn to Mya, we can also use the distance formula:
d(Mya, Jordyn) = sqrt((x3 - 6)^2 + (y3 - 4)^2)
Now, we need to use the information regarding angles to find the relationship between the distances. Given that the angle formed at Dylan's position is 50° and the angle formed at Jordyn's position is 76°, we can use the Law of Sines to set up a ratio:
sin(50°) / d(Dylan, Mya) = sin(76°) / d(Dylan, Jordyn)
Therefore, we can rearrange the equation to solve for d(Dylan, Jordyn):
d(Dylan, Jordyn) = (sin(50°) * d(Mya, Jordyn)) / sin(76°)
Using the above equation, we can find the distance from Jordyn to Dylan.
Similarly, we can solve for d(Mya, Jordyn) using the Law of Sines:
sin(76°) / d(Mya, Jordyn) = sin(50°) / d(Dylan, Jordyn)
Rearranging the equation above, we can solve for d(Mya, Jordyn).
Please note that to calculate the exact distances, we would need the coordinates of Jordyn's position.