To solve for the measure of wut, we start with the expressions provided:
- mvuw = 4x
- mwut = 6x + 10
First, we need to recognize the relationships and variables in the problem. Here, mvuw and mwut may represent measures of angles or segments, depending on the context, but they can also be viewed as expressions that contain the variable x.
We assume that wut is a portion of the angle or segment described by mwut. Therefore, we need to express wut in relation to the given equations.
To find the measure of wut, we can establish that:
wut = mwut - mvuwNow, substituting the values:
wut = (6x + 10) - 4xNow simplifying the equation:
wut = 6x + 10 - 4xwut = 2x + 10To find the exact measure of wut, we would need the value of x. If we had a specific value for x, we could substitute it back into the equation:
wut = 2(x) + 10For example, if x = 5, then:
wut = 2(5) + 10 = 10 + 10 = 20Therefore, the measure of wut can vary depending on the value of x. In general terms, the formula for wut is:
- wut = 2x + 10
In conclusion, without a specific value for x, we express wut as 2x + 10, providing a general solution based on the relationships given.