Unit 3 Test *critical course task
9 of 129 of 12 Items
Question
POSSIBLE POINTS: 7.69
Responses
The slope of the hypotenuse of the blue triangle is half the slope of the hypotenuse of the red triangle.
The slope of the hypotenuse of the blue triangle is half the slope of the hypotenuse of the red triangle.
The slope of the hypotenuse of the red triangle is the same as the slope of the hypotenuse of the blue triangle.
The slope of the hypotenuse of the red triangle is the same as the slope of the hypotenuse of the blue triangle.
The slope of the hypotenuse of the blue triangle is steeper than the slope of the hypotenuse of the red triangle.
The slope of the hypotenuse of the blue triangle is steeper than the slope of the hypotenuse of the red triangle.
The slope of the hypotenuse of the red triangle is steeper than the slope of the hypotenuse of the blue triangle.
Without an image or more information about the triangles, it is impossible to determine which of the responses is correct. Please provide additional information or a visual aid.
fat nerd
The slope of the hypotenuse of the blue triangle is half the slope of the hypotenuse of the red triangle.
To determine the relationship between the slopes of the hypotenuses of the blue and red triangle, you need to analyze the given information. The options are:
1. The slope of the hypotenuse of the blue triangle is half the slope of the hypotenuse of the red triangle.
2. The slope of the hypotenuse of the red triangle is the same as the slope of the hypotenuse of the blue triangle.
3. The slope of the hypotenuse of the blue triangle is steeper than the slope of the hypotenuse of the red triangle.
4. The slope of the hypotenuse of the red triangle is steeper than the slope of the hypotenuse of the blue triangle.
To find the relationship, you need to compare the slopes of the hypotenuses of the two triangles. This can be done by analyzing the sides of the triangles. The slope is determined by the change in the vertical distance divided by the change in the horizontal distance.
To calculate the slopes, you need to know the coordinates of two points on the hypotenuses of both triangles. Once you have the coordinates, use the formula:
slope = (change in y-coordinates) / (change in x-coordinates)
Compare the slopes of the hypotenuses using the calculated values. If the slope of the blue triangle hypotenuse is half of the slope of the red triangle hypotenuse, then option 1 is correct. If both slopes are the same, option 2 is correct. If the slope of the blue triangle hypotenuse is steeper than the red triangle, choose option 3. And if the slope of the red triangle hypotenuse is steeper than the blue triangle, select option 4.