$$ 4 imes $$ Which equation has both 5 and -5 as possible values of $$ y $$ ?

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$$ 4 	imes $$ Which equation has both 5 and -5 as possible values of $$ y $$ ?

UpStudy AI · Accepted Answer

To find the equation that has both 5 and -5 as possible values of $$ y $$, we need to consider the equation in the form of $$ y = mx + b $$, where $$ m $$ is the slope and $$ b $$ is the y-intercept.

Given that both 5 and -5 are possible values of $$ y $$, we can substitute these values into the equation to find the corresponding values of $$ x $$.

Let's denote the equation as $$ y = mx + b $$.

Substituting $$ y = 5 $$ into the equation, we get:
$$ 5 = mx + b $$

Substituting $$ y = -5 $$ into the equation, we get:
$$ -5 = mx + b $$

Now, we have two equations:
1. $$ 5 = mx + b $$
2. $$ -5 = mx + b $$

To find the equation that satisfies both conditions, we can solve these two equations simultaneously.

Let's solve these equations to find the values of $$ m $$ and $$ b $$ that satisfy both conditions.
Solve the system of equations by following steps:
- step0: Solve using the substitution method:
  $$\left\{ \begin{array}{l}5=mx+b\-5=mx+b\end{array}\right.$$
- step1: Solve the equation:
  $$\left\{ \begin{array}{l}b=5-mx\-5=mx+b\end{array}\right.$$
- step2: Substitute the value of $$b:$$
  $$-5=mx+5-mx$$
- step3: Simplify:
  $$-5=5$$
- step4: Calculate:
  $$\left\{ \begin{array}{l}b \in \varnothing \m \in \varnothing \x \in \varnothing \end{array}\right.$$
- step5: Rewrite:
  $$(b, m, x) \in \varnothing$$
The system of equations does not have any solution. This means that there is no equation that has both 5 and -5 as possible values of $$ y $$.

Therefore, there is no equation that satisfies both conditions.
There is no equation that has both 5 and -5 as possible values of $$ y $$.

\( 4 \times \) Which equation has both 5 and -5 as possible values of \( y \) ?

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