Answer: First Option
a) exponential function going through point (0, 2) and ending up on the right
Step-by-step explanation:
Look at the attached image, the red line represents a function of the form:
Note that this function cuts to the axis and at the point (0, 1)
Also when x tends to ∞ f(x) tends to ∞ and when f(x) tends to -∞ then f(x) tends to zero.
If we perform the transformation 
then the graph of y is equal to the graph of f(x) displaced 1 unit up. Then the new cutting point with the axis y will be: (0, 2) as shown in the attached image (blue line)
The transform function is 
Finally the answer is the first option
The quotient for the question is: -343
Answer:
(1,10) That is the slope, if there is another line then the answer will be different!
Step-by-step explanation:
This is the slope-intercept formula, (y=mx+b)
Start by finding the y-intercept which is Positive 7 or plus 7 you should find it on the y-axis on the positive side.
Then you will need to identify the slope, the slope, in this case is 3, which needs to be in rise over run formula so 3 over 1.
To find a slope you must start at the y-intercept in your case is 7, then you must go up 3 and right 1.
Then identify the x and y axis.
If this is not the answer please provide this equation and another one to get them intersecting to get one point.
Answer:
10/9
Step-by-step explanation:
What you need to do is change the division sign into a multiplication sign and flip the last quotient to 8/3.
5/12*8/3=10/9.
Slope is equal to rise over run. In this case there is a point at (0,-5), and (12,3). The change in the y is positive 8, and x positive 12. Because of the slope formula change in y over change in x, you could write this as 8/12, or 2/3. The equation would then be
y=2/3x-5
