Answer:201525
Step-by-step explanation:
Given:
The graph of a piecewise function.
To find:
The value of h(3).
Solution:
We have, the graph of a piecewise function h(x).
The function is divided into two pieces. One is over the interval 
and another one is over the interval 
.
From the given graph it is clear that the function passes through the point (3,1). It means the values of the function is 1 at x=3.
at x=3.
The value of h(3) is 1.
Therefore, the correct option is C.
Answer/Step-by-step explanation:
The equation of the line that passes through the two points would be correct if each point, when substituted into the equation, satisfy the equation.
This is what I mean:
Given the equation of the line, y = 2x - 5, and the two points (-2, -9) and (3, 1):
For the first point, substitute x = -2, and y = -9 into y = 2x - 5.
Thus:
-9 = 2(-2) - 5
-9 = -4 - 5
-9 = -9 (this is true). It means the line runs through the point (-2, -9)
For the second point, substitute x = 3, and y = 1 into y = 2x - 5
This:
1 = 2(3) - 5
1 = 6 - 5
1 = 1 (this is true). This also means the point, (3, 1) is also a point that the equation runs across.
3x+5-13x = 25
Subtract 13x from 3x
5 - 10x = 25
Subtract 5 from both sides
-10x = 20
Divide -10 on both sides so that the only thing remaining on the left side is the variable x.
Final Answer: -2
