Questions LLC
Login
or
Sign Up
Ask a New Question
Mathematics
Geometry
Triangles
The following statements describe triangles ABC and PQR. For ΔABC : AC=2, AB=4, and BC=5 For ΔPQR : QR=7.5, PR=3, and PQ=6 Which statement explains why ΔABC and ΔPQR are either similar or not similar.
1 answer
The statement that explains why ΔABC and ΔPQR are either similar or not similar is that the triangles have the same angle measures.
You can
ask a new question
or
answer this question
.
Related Questions
1. If RST=NPQ, which of the following is true?
A) R=P B) R=Q C) T=P D) T=Q <---- My answer 2. Given ABC=PQR, m<B=3v+4, and
Let ABC be any triangle. Equilateral triangles BCX, ACY, and BAZ are constructed such that none of these triangles overlaps
ΔABC and ΔCDE are similar triangles.
(Image) Which statement is TRUE concerning the slope of the line formed by the hypotenuse
For the triangles described, which of the following statements must be true?
In A DEF, DE = 8 in., DF = 23 in., and mLD = 16° In
Consider ΔABC , with vertices A(0,3) , B(0,1) , and C(−4,2) , and ΔDEF , with vertices D(0,6) , E(0,2) , and F(8,4) . Which
On the coordinate plane, ΔABC ≅ ΔDEF by SSS. ΔABC translates 2 units to the left and 3 units down. Do the triangles remain
Marcus and Marlee are comparing △ABC with right angle B with △PQR with right angle Q to determine if they are congruent.
∆PQR has vertices at P(2, 4), Q(3, 8) and R(5, 4). A dilation and series of translations map ∆PQR to ∆ABC, whose vertices
choose all the statements that are true about right triangles
a. right triangles have interior angles that add to equal 180
Given abc=pqr,m