Write an algebraic expression that uses x, y, and z and simplifies to the given value when x = -3, y = -2, and z = -1. The expression should involve only multiplication or division.
How to do this when value is -16?
But the expression says only multiplication and division are allowed.
To find an algebraic expression that simplifies to a given value when substitute x = -3, y = -2, and z = -1, we first need to determine the relationship between x, y, and z that results in the desired value.
Let's start by setting up an equation using x, y, and z:
x * y / z
Now, we substitute the values for x, y, and z to get the desired value, which is -16:
(-3) * (-2) / (-1) = -16
Therefore, the algebraic expression that satisfies the given conditions is:
x * y / z = -16
In this case, (-3) * (-2) / (-1) simplifies to -16.
there are a zillion ways to form an expression that evaluates to -16.
x^2 y + 2z
(1-x)y^2 z
5x+y-z
...
let your imagination run wild!