Use the image to answer the question.
A line segment shows 4 closed points at different intervals labeled as follows: C on the left end, 2nd is G, 3rd is R, and X on the right end. The distance between C and G is labeled 7 units, between G and R as 5 units, and between R and X as 3 units.
Determine the segment length for the third side of a triangle if its first two sides are CR and GX and no two sides of the triangle are equal. List the segment lengths based on the graph in ascending order.
wrong
its friggen 5 7 15
this practice is crap
To determine the segment length for the third side of the triangle, we need to find the segment length between points C and X, as it represents the third side of the triangle.
According to the given information, the distance between C and G is 7 units, the distance between G and R is 5 units, and the distance between R and X is 3 units.
To find the segment length between C and X, we need to add up the distances between the intermediate points:
Distance between C and G: 7 units
Distance between G and R: 5 units
Distance between R and X: 3 units
Adding these distances together, we get: 7 + 5 + 3 = 15 units
Therefore, the segment length between C and X, which represents the third side of the triangle, is 15 units.
To list the segment lengths based on the graph in ascending order, we have:
Segment length between R and X: 3 units
Segment length between G and R: 5 units
Segment length between C and G: 7 units
Remember, these segment lengths represent the sides of the triangle in ascending order.
Segment length: 8 units
Ascending order: 3, 5, 7, 8