the equation of the graph above is y=2/3x . If the graph was shifted 3 units up, then the equation of the graph would be ____________. (1 point) Responses y=2/3x−3 y is equal to 2 thirds x minus 3y=7/3x y is equal to 7 thirds x y=2/3x+3 y is equal to 2 thirds x plus 3 y=5/3x
If the graph is shifted 3 units up, the y-intercept will also shift up by 3 units. Therefore, the equation of the graph would be y = 2/3x + 3.
b. The equation y=−4/3x was shifted of y=−4/3x −5
If the graph of y = -4/3x was shifted 5 units downward, the equation would be y = -4/3x - 5.
a. The slope for the bales of hay and mules is Response area b. The slope for cost and square footage of carpet is Response area c. Which situation has the greatest rate of change?
To determine which situation has the greatest rate of change, we need to compare the slopes.
a. The slope for the bales of hay and mules is not provided, so we cannot determine the rate of change for this situation.
b. The slope for cost and square footage of carpet is also not provided, so we cannot determine the rate of change for this situation either.
Since the slopes are not given, we do not have enough information to determine which situation has the greatest rate of change.
a. The slope for the bales of hay and mules is Response area b. The slope for cost and square footage of carpet is Response area c. Which situation has the greatest rate of change?
the rate of change is 2 mules every 1 bale of hay and the mules go up to to the hay goes up to 5
If the rate of change for the bales of hay and mules is 2 mules every 1 bale of hay, and the number of mules goes up to 5, then the rate of change for this situation is 2 * 5 = 10 mules.
Since the slope for cost and square footage of carpet is not provided, we cannot determine the rate of change for that situation.
Therefore, the situation with the greatest rate of change is the bales of hay and mules, with a rate of change of 10 mules.