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To determine if PQR is equal to STU, we would need more context regarding what PQR and STU represent, such as whether they are mathematical expressions, geometric figures, or something else. If they are defined in a specific way that allows for comparison, then we could analyze their properties to establish equality. Without additional information, it's impossible to definitively answer the question.
What else can I help you with?
If PQR STU what is the scale factor of PQR to STU?
To determine the scale factor from triangle PQR to triangle STU, you need the lengths of corresponding sides from both triangles. The scale factor is found by dividing the length of a side in triangle STU by the length of the corresponding side in triangle PQR. For example, if side PQ measures 4 units and side ST measures 8 units, the scale factor would be 8/4 = 2. Without specific side lengths, the scale factor cannot be calculated.
What is missing o0ut of the alphabet order?
abcdefghijklmnopqrstuvwxyz abc"""""""""""""def""""""""""""""ghi'''''''''''''''''''''jkl'''''''mno'''''''''''pqr''''''''''''''''''stu''''''''''''''''''''''''''vwx ''''''''''''''''''''''''''''''y what's missing abcdefghijklmnopqrstuvwxyz abc"""""""""""""def""""""""""""""ghi'''''''''''''''''''''jkl'''''''mno'''''''''''pqr''''''''''''''''''stu''''''''''''''''''''''''''vwx ''''''''''''''''''''''''''''''y what's missing
What are baseball player Stu Pomeranz's physical stats?
Stu Pomeranz is 6 feet 7 inches tall. He weighs 220 pounds. He bats right and throws right.
What are baseball player Stu Flythe's physical stats?
Stu Flythe is 6 feet 2 inches tall. He weighs 175 pounds. He bats right and throws right.
What is the Christian name of the first great Medici?
Stu Pid
Given that pqr stu what is the scale factor of pqr to stu?
1/5
If triangle PQR is congruent to triangle STU which statement must be true?
PQ ST
If PQR STU what is the scale factor of PQR to STU?
To determine the scale factor from triangle PQR to triangle STU, you need the lengths of corresponding sides from both triangles. The scale factor is found by dividing the length of a side in triangle STU by the length of the corresponding side in triangle PQR. For example, if side PQ measures 4 units and side ST measures 8 units, the scale factor would be 8/4 = 2. Without specific side lengths, the scale factor cannot be calculated.
Is PQR STU If so name the congruence postulate that applies?
congruent - asa
Kira drew PQR and STU so that P S Q T PR 12 and SU 3. Are PQR and STU similar If so identify the similarity postulate or theorem that applies.?
Similar -AA (got it right on apex)
What is missing o0ut of the alphabet order?
abcdefghijklmnopqrstuvwxyz abc"""""""""""""def""""""""""""""ghi'''''''''''''''''''''jkl'''''''mno'''''''''''pqr''''''''''''''''''stu''''''''''''''''''''''''''vwx ''''''''''''''''''''''''''''''y what's missing abcdefghijklmnopqrstuvwxyz abc"""""""""""""def""""""""""""""ghi'''''''''''''''''''''jkl'''''''mno'''''''''''pqr''''''''''''''''''stu''''''''''''''''''''''''''vwx ''''''''''''''''''''''''''''''y what's missing
Is triangle pqr equal to triangle stu and If so name the congruents postulate that applies?
yes
What is the similarity postulate or theorem that applies.David drew PQR and STU so that P S PR 12 SU 3 PQ 20 and ST 5. Are PQR and STU similar?
Similar SAS-apex
If Kira drew PQR and STU so that P S Q T PR 12 and SU 3. Are PQR and STU similar If so identify the similarity postulate or theorem that applies.?
Yes, triangles PQR and STU are similar. They are similar by the Side-Side-Side (SSS) similarity postulate because the ratios of their corresponding sides are equal. Given that PR = 12 and SU = 3, the ratio PR/SU = 12/3 = 4, indicating that all corresponding sides maintain the same ratio. Thus, the triangles are similar due to proportionality of their sides.
If PQR and STU so that P S Q T PR 12 and SU 3. Are PQR and STU similar If so identify the similarity postulate or theorem that applies.?
Triangles PQR and STU are similar if their corresponding sides are in proportion. Given that PR = 12 and SU = 3, we can check the ratio of the sides: PR/SU = 12/3 = 4. If the other pairs of corresponding sides also maintain this ratio, then the triangles are similar by the Side-Side-Side (SSS) similarity theorem. However, without additional side lengths for the other sides, we cannot definitively conclude similarity.
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.
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.
