Answer: The given literal equation is:
t = 2x₂ / (292 / 4x²)
To solve for "m", we need to isolate "m" on one side of the equation. We can do this by multiplying both sides of the equation by the denominator of the right-hand side:
t * (292 / 4x²) = 2x₂
Next, we can simplify the left-hand side by canceling out the factor of 4 in the denominator:
t * (73 / x²) = 2x₂
Now we can multiply both sides by x² to isolate the term with "x₂" on the right-hand side:
t * 73 = 2x₂ * x²
Simplify the right-hand side by multiplying the exponents:
t * 73 = 2x₄
Finally, we can solve for "x" by dividing both sides by 2:
x₄ = t * 73 / 2
Therefore, the solution for "x" is:
x₄ = (73/2) * t
Note that we can also substitute this value of "x" back into the original equation to solve for "m". However, the given equation does not provide any information about "m", so we cannot find a specific value for "m".
Explanation: