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Which 2 statements contradict each other triangle pqr is equilateral and triangle pqr is a right triangle and triangle pqr is isosceles?
An equilateral and right triangle are contradictory.
is this statement true or false for equilateral PQR?
true
Find PQR triangle m angle b 45 and measure angle a 65 Bc 7cm?
The question appears to be a concatenation of two (or more) questions. A triangle, PQR does not have side Bc. It would not have angle b nor a.
Given that pqr stu what is the scale factor of pqr to stu?
1/5
what- PQR has vertices?
(-2,4)
If triangle PQR is congruent to triangle STU which statement must be true?
PQ ST
Which 2 statements contradict each other triangle pqr is equilateral and triangle pqr is a right triangle and triangle pqr is isosceles?
An equilateral and right triangle are contradictory.
is this statement true or false for equilateral PQR?
true
Is triangle pqr equal to triangle stu and If so name the congruents postulate that applies?
yes
In right triangle JKL mK 44. In right triangle PQR mQ 44. Which similarity postulate or theorem proves that JKL and PQR are similar?
The answer will be AA which is short for (Angle Angle). Hope this helped.
Find PQR triangle m angle b 45 and measure angle a 65 Bc 7cm?
The question appears to be a concatenation of two (or more) questions. A triangle, PQR does not have side Bc. It would not have angle b nor a.
In a triangle ABC If angle BAC is 75 find the measure of angle PQR?
Answers
Find the ratio of area of the triangles ABC and PQR such that AB = BC=CA = 6m each and PQ, QR, RP are half of the sides AB BC and CA respectively?
Since the sides of triangle are equal, the triangles are equilateral. Just for your information, in this question, we do not require the length of sides. It is just additional information. :) The area of equilateral triangle is: (√3)/4 × a², where a is the side of the equilateral triangle. For triangle ABC, area will be = (√3)/4 × a² (Let 'a' is the side of triangle ABC) Since, side of triangle PQR is half that of ABC, it will be = a/2 Therefore, area of triangle PQR = (√3)/4 × (a/2)² = (√3)/16 × a² Take the ratio of areas of triangle ABC and PQR: [(√3)/4 × a²] / [(√3)/16 × a²] = 4:1
Triangle PQR has angles in the ratio of 2 35 . which type of triangle is PQR?
The sum of the angles in a triangle is 180. Since the ratio of the angles is 2:3:5 their measurements are 2x, 3x, and 5x. When you add them together you will get 180. So... 2x+3x+5x=180 10x+180 x=18 Since x=18 the measure of the angles are 2x=36 3x=54 5x=90 Since one of the angles is 90 we know that the triangle is a RIGHT triangle.
Given that pqr stu what is the scale factor of pqr to stu?
1/5
If abc is congruent to def and mno is congruent to pqr then is abc congruent to pqr by the transitive property?
True, ABC is congruent to PQR by the transitive property.
Pqr is a right triangle if pq equals 8 what is rq?
Sorry, but data not adequate. However, I'll try. Suppose the triangle is right angled at R. Then PQ = hypotenuse = 8. Further, if the triangle is isosceles, then RQ = 4 times sqrt(2).
