46/90 = 23/45
Yes, 46/90 can be simplified. Both 46 and 90 are divisible by 2, so we can divide both numbers by 2. This gives us 23/45. They share no common factors, so 23/45 is already in its simplest form.
The median of 65 and 90 is the same as their mean: 77.5The median of 65 and 90 is the same as their mean: 77.5The median of 65 and 90 is the same as their mean: 77.5The median of 65 and 90 is the same as their mean: 77.5
1/2 of 90 is what number goes into 90 twice. For example: 1/2 of 30 is 15. 15+15 = 30. 1/2 of 90 is 45. 45+45 = 90.
The median of those numbers is 90.
Subtract 90 - 46.
The median of a single number, such as 45603456209034, is the number itself.
60
The median of a single observation is the value of that observation. So the median of 90 is 90. Not much point in going to all that trouble, but there you go.
46/90 = 23/45
The MEDIAN is the number in the middle. In order to find the median, you have to put the values in order from lowest to highest, then find the number that is exactly in the middle. For example : 80 85 90 90 90 100 ^ since there is an even number of values, the MEDIAN is between these two, or it is 90. Notice that there is exactly the same number of values above the median as below it! Its that simple.
Yes, 46/90 can be simplified. Both 46 and 90 are divisible by 2, so we can divide both numbers by 2. This gives us 23/45. They share no common factors, so 23/45 is already in its simplest form.
The median of 65 and 90 is the same as their mean: 77.5The median of 65 and 90 is the same as their mean: 77.5The median of 65 and 90 is the same as their mean: 77.5The median of 65 and 90 is the same as their mean: 77.5
Divide the sum of the two consecutive even integers by 2: 90/2 = 45. The smaller of these integers will be one less than 45 and the larger will be one more than 45, so the two consecutive even integers will be 44 and 46.
It is 45%
1/2 of 90 is what number goes into 90 twice. For example: 1/2 of 30 is 15. 15+15 = 30. 1/2 of 90 is 45. 45+45 = 90.
Half of 90 is 45 (90 divided by 2)