15
what is the midpoint between 9.9 and 10
sjsjiajska
If you mean points of (-1, 10) and (9, -1) then the midpoint is (4, 4.5)
Points:(4, 3) and (10, -5) Midpoint: (4+10)/2, (3-5)/2 = (7, -1)
Not too sure of (410) because it could mean (4, 10) or (41, 0) But the midpoint is found by: (x1+x2)/2 and (y1+y2)/2 which will give the midpoint of (x, y)
The midpoint between two numbers is calculated by finding the average of those numbers. For 10 and 20, you add the two numbers together (10 + 20 = 30) and then divide by 2. Thus, the midpoint is 30 / 2 = 15. Therefore, the midpoint of 10 and 20 is 15.
Points: (0, 0) and (20, 0) Midpoint: (10, 0)
The frequency class midpoint is calculated by taking the average of the lower and upper boundaries of a class interval. Specifically, you add the lower boundary to the upper boundary and then divide the sum by two. This midpoint represents the center point of that class and is often used in statistical calculations, such as determining the mean of grouped data. For example, if a class interval is 10-20, the midpoint would be (10 + 20) / 2 = 15.
To find the midpoint of a segment with endpoints at (-15) and (55), you can use the midpoint formula: ((x_1 + x_2) / 2). Substituting the values, the midpoint is ((-15 + 55) / 2 = 40 / 2 = 20). Therefore, the midpoint of the segment is (20).
To find the midpoint of a class interval, you add the lower limit and the upper limit of the interval and then divide the sum by 2. For example, if the class interval is 10-20, the midpoint would be (10 + 20) / 2 = 15. This midpoint can then be used in calculations like finding the mean or in statistical analysis involving frequency distributions.
If you mean: (10, -3) and (1, 0) then the midpoint is at (5.5, -1.5)
The midpoint is (10,0). The simplest way to calculate it is to divide the change in x by 2. You can see that the difference is 20-0 = 20, divided by 2 is 10.
what is the midpoint between 9.9 and 10
To calculate the x-coordinate of the midpoint of a horizontal segment with endpoints (-20, 0) and (20, 0), you can use the midpoint formula: ( M_x = \frac{x_1 + x_2}{2} ). Here, ( x_1 = -20 ) and ( x_2 = 20 ). Plugging in these values gives ( M_x = \frac{-20 + 20}{2} = \frac{0}{2} = 0 ). Thus, the x-coordinate of the midpoint is 0.
The midpoint is at: (10, -2)
sjsjiajska
The midpoint is at (7, 6)