Answer:
Step-by-step explanation:
When dividing by the same base (r) subtract exponents.
A property of the roots say:
Therefore;
Sorry was answering wrong question.
<h3>
Answer:</h3>
A: see below
B: no
<h3>
Step-by-step explanation:</h3>
Part A. The first equation graphs as the area below the dashed line with y-intercept -7 and slope 2.
The second equation graphs as the area above the solid line with x-intercept 6 and y-intercept 3.
The doubly-shaded area representing the solution space is that space approximately the upper-right quadrant of the four sections of the coordinate plane created by the intersection of the lines.
Part B. The point (3, -7) is in the lower-right quadrant of the sections of the coordinate plane described in part A. Thus it is NOT A SOLUTION.
The point (3, -7) fails to satisfy the second inequality. That is ...
-7 ≥ -1/2·3 +3 = 3/2 . . . . is NOT TRUE
In order to be part of the solution space, a point must satisfy <em>both</em> inequalities.
(2,14) is the answer I’m pretty sure