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# Equivalent Expressions?

## Task

If we multiply $\frac{x}{2} + \frac34$ by 4, we get $2x+3$. Is $2x+3$ an equivalent expression to $\frac{x}{2} + \frac34$?

## IM Commentary

The purpose of this task is to directly address a common misconception held by many students who are learning to solve equations. Because a frequent strategy for solving an equation with fractions is to multiply both sides by a common denominator (so all the coefficients are integers), students often forget why this is an "allowable" move in an equation and try to apply the same strategy when they see an expression. Two expressions are equivalent if they have the same value no matter what the value of the variables in them. After learning to transform expressions and equations into equivalent expressions and equations, it is easy to forget the original definition of equivalent expressions and mix up which transformations are allowed for expressions and which are allowed for equations.

## Solution

No, $2x + 3$ and $\frac{x}{2} + \frac34$ are not equivalent expressions because they do not yield the same result for most values of $x$. For example, when $x = 1$, we get

$$ 2(1) + 3 = 5 $$

and

$$ \frac{(1)}{2}+\frac34=\frac54 \neq 5 $$

Therefore, they are not equivalent. In fact, the expression $2x + 3$ will be 4 times as big as $\frac{x}{2} + \frac34$ for all values of $x$, since we obtained it by multiplying $\frac{x}{2} + \frac34$ by 4.

## Equivalent Expressions?

If we multiply $\frac{x}{2} + \frac34$ by 4, we get $2x+3$. Is $2x+3$ an equivalent expression to $\frac{x}{2} + \frac34$?

## Comments

Log in to comment## Cam says:

over 3 yearsThe two expressions $\frac{x}{2}+\frac34$ and $2x+3$ are

equalwhen $x=-3/2$, but the question of equivalence is a question about whether the two expressions are equal forallvalues of $x$. Since there is at least one real number $x$ for which the two expressions are not equal (e.g., $x=1$), the two expressions are not equivalent.## James says:

almost 4 yearsIf we restrict this to being in the first quadrant then the conclusion is right for all x's from zero to infinity but the fact that the slopes vary implies that the two lines must intersect i.e. there must be a point that the two solutions are equivalent (but only one since the two are linear expressions).

## James says:

almost 4 yearsExcept when x = -3/2. At that value only are they equivalent.