Final answer:
To solve for W in the equation L = √5/TW, you square both sides, rearrange the equation to isolate W^2, and then take the square root of both sides to solve for W, resulting in W = √(5/L^2T^2).
Step-by-step explanation:
The student has provided the equation L = √5/TW and is asking how to solve for W. To isolate W, you need to manipulate the equation algebraically.
First, you will want to square both sides, eliminating the square root on the left side.
The equation will become L^2 = 5/T^2W^2.
Next, you will multiply both sides by T^2W^2 to get rid of the fraction on the right, resulting in L^2T^2W^2 = 5.
Then divide both sides by L^2T^2 to isolate W^2, getting W^2 = 5/L^2T^2.
Finally, take the square root of both sides to solve for W, which gives you W = √(5/L^2T^2).