Answer: SR ≅ UT
Step-by-step explanation:
Process of elimination:
1) RT ≅ TR doesn't help because RT and TR are the same line.
2) RU ⊥ TU doesn't help prove that ΔRST ≅ ΔTUR. It only proves that ∠TUR is a right angle (which is already given).
3) SR ⊥ ST also doesn't help prove that ΔRST ≅ ΔTUR. It only proves that ∠RST is a right angle (which is already given).
4) The statement that SR ≅ UT tells us that ΔRST and ΔTUR are right triangles and have a hypotenuse and leg in common (both triangles share a hypotenuse, RT, both triangles have a 90 degree angle, and SR ≅ UT). If SR ≅ UT, we can prove ΔRST ≅ ΔTUR by using the HL triangle congruence theorem.
Answer:
might be 3
Step-by-step explanation:
A' ( - 3, 2 ) that is B
a translation ( x - 5, y + 3 ) means subtract 5 from the x- coordinate and add 3 to the y-coordinate 3
A(2, - 1 ) → A'(2 - 5, - 1 + 3 ) → A'( - 3, 2 )
Answer:
The new scale drawing is 
the new dimensions of the scale drawing in the attached figure
Step-by-step explanation:
<em>Find the original scale drawing </em>
we know that
6 cm in the drawing represent 3 meters in the actual
so
Simplify
The original scale was 
That means ---> 2 cm in the drawing represent 1 meter in the actual
<em>Find the new scale drawing </em>
we know that
18 cm in the drawing represent 3 meters in the actual
so
Simplify
The new scale is
That means ---> 6 cm in the drawing represent 1 meter in the actual
therefore
the new dimensions of the scale drawing in the attached figure
