In Exercises 45–47, solve each formula for the specified variable. T = (A-P)/Pr for P

Algebraic manipulation involves rearranging equations to isolate a specific variable. This process includes operations such as adding, subtracting, multiplying, and dividing both sides of the equation by the same value. Understanding how to manipulate equations is crucial for solving for a variable, as it allows one to express the variable in terms of others.

Isolating a variable means rewriting an equation so that the variable of interest stands alone on one side. This often requires a series of steps that may include moving terms across the equation and simplifying. In the context of the given formula, isolating P involves strategically rearranging the equation to express P in terms of T, A, and r.

Formulas are mathematical expressions that describe relationships between variables. In this case, the formula T = (A-P)/Pr relates T, A, P, and r. A solid grasp of how each variable interacts within the formula is essential for effective manipulation and solving for the desired variable, ensuring that the relationships are maintained throughout the process.