The discussion revolves around solving for the variable v in a physics problem involving projectile motion, where the relationship between v, angle theta, gravitational acceleration g, and horizontal distance x is expressed through an equation. The values for x, theta, and g are provided, and participants are attempting to manipulate the equation to isolate v.
The conversation is ongoing, with participants providing different algebraic strategies and questioning the validity of their approaches. Some have noted the potential for false answers due to squaring the equation, while others suggest using variable substitutions to simplify the problem. There is no explicit consensus on the best method yet.
Participants are working under the constraints of the original equation and the provided values for x, theta, and g. There is a focus on ensuring that the algebraic manipulations adhere to the mathematical principles involved in solving the equation.
marthkiki said:The Attempt at a Solution
I've gotten all the way down to
v^2 = (v^4-86612.49)^1/2 + 4.165
What do I do from here?
rock.freak667 said:you'll need to re-write it asv2 - 4.165= (v4-86612.49)1/2
then square both sides and solve. You may need to use a numerical method. You'll need to test your solutions as squaring both sides might give you false answers.
HallsofIvy said:How "only 1 V term"? There will be v^4 and v^2 terms but then you can let u= v^2 and will have a quadratic to solve for u.
The left-hand side is not squared properly. The left hand side should be (v^2 - 17.35)^2 = v^4 - 2(17.35)v^2 + (17.35)^2. The v4's will then cancel and you will be left with a quadratic in v. You will need to check the two answers you get, as squaring both sides of an equation introduces new solutions that may not solve the original equation. Ie., x = -1 and x2 = 1, which introduces the solution x = 1.marthkiki said:By squaring both sides, I get v^2 - 17.35 = v^4 - 86612.49.