A point is translated on the coordinate plane from (4, - 1) to (4, 2) Journey writes the function g(y) = y + k to describe the translationWhat is the value of K?
To find the value of k, we need to determine the difference in the y-coordinates before and after the translation.
The original y-coordinate is -1, and after the translation, it becomes 2. The difference between these two y-coordinates is 2 - (-1) = 3.
Since the function g(y) = y + k, we can see that the value of k that will result in a translation of 3 units is K = 3.
Therefore, the value of k is 3.
The coordinate point Q (0, 10) is reflected over the y-axis Identify the x - 3 and y-coordinates of its image, Q'
When a point is reflected over the y-axis, the x-coordinate is negated and the y-coordinate remains the same.
The original x-coordinate of point Q is 0. When reflected over the y-axis, the x-coordinate becomes -0, which can be simplified as just 0.
The original y-coordinate of point Q is 10. When reflected over the y-axis, the y-coordinate remains the same.
Therefore, the x-coordinate of the image Q' is 0, and the y-coordinate of the image Q' is still 10.
To find the value of k in the function g(y) = y + k that describes the translation of a point from (4, -1) to (4, 2), we need to determine the translation of the y-coordinate.
The translation of the y-coordinate can be found by subtracting the original y-coordinate (-1) from the new y-coordinate (2).
2 - (-1) = 3
Therefore, the value of k is 3.
To find the value of K, we need to understand what the translation entails. In this case, a point is being translated vertically. The translation is happening from (4, -1) to (4, 2).
To find the vertical translation, we can subtract the y-coordinate of the original point from the y-coordinate of the translated point.
In this case, the y-coordinate of the original point is -1 and the y-coordinate of the translated point is 2.
To find the value of K, we need to determine the difference between these two y-coordinates.
2 - (-1) = 2 + 1 = 3
Therefore, the value of K is 3. The function g(y) = y + k, where k = 3.