You have been asked by the police to find one of the three locations the Acute Perps gang is likely to hit in the coming weeks.
Because the gang sticks to a triangular pattern, the locations could be a translation, reflection, or rotation of the original triangle. Choose one of the following scenarios to help locate the gang: Obtuse Scalene Triangle Translation to prove SSS Congruence
Isosceles Right Triangle Reflection to prove ASA Congruence
Equilateral Equiangular Triangle Rotation to prove SAS Congruence
After you have selected the one transformation you will be completing, go to step 2 for detailed directions.
First, construct a triangle as indicated by your choice in step 1 on a coordinate plane. For example, if you chose to use an obtuse scalene triangle translation to prove SSS Congruence, then you will construct an obtuse scalene triangle. Make sure to measure your triangle's angles and sides. You can use the concept of distance and slope to ensure your triangle satisfies the criteria indicated by your choice. Write down the original coordinates of this triangle.
Next, identify and label three points on the coordinate plane that are the transformation of your original triangle. Make sure you use the transformation indicated within the scenario you selected. For example, if you chose to use an obtuse scalene triangle translation to prove SSS Congruence, then you complete a translation of your triangle. Remember, you only need to complete one transformation on your triangle. Write down these new coordinates for this second triangle.
If you chose Obtuse Scalene Triangle Translation to prove SSS Congruence, use the coordinates of your transformation along with the distance formula to show that the two triangles are congruent by the SSS postulate. You must show all work with the distance formula and each corresponding pair of sides to receive full credit.
Provide an answer to the questions that match your selected scenario. Because you only completed one scenario, only one group of questions should be answered in complete sentences and submitted with your work.
Obtuse Scalene Triangle Translation to prove SSS Congruence
Describe the translation you performed on the original triangle. Use details and coordinates to explain how the figure was transformed, including the translation rule you applied to your triangle.
What other properties exist in your triangle? Discuss at least two theorems you learned about in this module that apply to your triangle. Make sure to show evidence by discussing your triangle's measurements.
Did your triangle undergo rigid motion? Explain why.
yes ma'am I will be in a bit for pet room and down and up and down the stairs for the next one is the most common form of the following week and down the road and the other groups would be jealous for the kids to come back from school
The slope-intercept equation of a line in a plane should be in the form for some constant ("slope") and constant (-"intercept".)
In the slope-intercept equation, should be the only term on the left-hand side of the equation with a coefficient of . No term on the right-hand side shall include .
Rewrite the given equation to obtain the slope-intercept equation of this line.
(Add to both sides of this equation.)
.
. (Divide both sides by , such that the coefficient of becomes as required.)
Therefore, the slope-intercept equation of this line would be , with slope and -intercept .