You have a function that for every well-behaved day adds $1. Let's call x the well-behaved days and y the amount of money in the fund. We can then make a table that looks like this:
X (well behaved days) , Y (money in fund)
0, 0
1, 1
2, 2
3, 3
4, 4
5, 5
If you take these as points: (0,0), (1,1), (2,2) , ... and plot them you get a line. The relationship is linear.
Another way you can tell is that y = x which is the equation of a line with slope = 1 and y-intercept 0 although for this case we only focus on x values that are 0 or greater because there would not be a negative number of well-behaved days.
A third way you can tell is that the money in the fund increases by the same amount (1) for each well-behaved day. That is, it's rate of change is constant (always 1) and so it is linear...it has a constant rate of change or a constant slope.
Step-by-step explanation:
(2x +y)(3x²+y)
6x³ + 2xy² + 3x²y + y²
Your answer is the 3rd option, 23
Absolute values result in just the positive version of the number on the inside.
This gives us:
6 + 3(4) + 5 - 0 x 6
PEMDAS tells us to multiply first so we do.
6 + 12 + 5 - 0.
Now add like regular.
18 + 5 = 23.
<span>The factor pairs are 1*104, 2*52, 4*26, and 8*13</span>
Answer:then what?
Step-by-step explanation: