QUESTION IMAGE
Question
in exercises 13-16, list the sides of the given triangle from shortest to longest. (see example 4.)
13.
14.
15.
16.
For each triangle, we use the rule: In a triangle, the length of a side is proportional to the measure of its opposite angle (longer side opposite larger angle, shorter side opposite smaller angle).
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Problem 13:
Step1: Identify opposite angles/sides
- $\angle A=62^\circ$ opposite $BC$
- $\angle B=67^\circ$ opposite $AC$
- $\angle C=51^\circ$ opposite $AB$
Step2: Order angles smallest to largest
$51^\circ < 62^\circ < 67^\circ$
Step3: Match to opposite sides
$\angle C < \angle A < \angle B \implies AB < BC < AC$
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Problem 14:
Step1: Calculate missing angle
Sum of angles in triangle: $180^\circ - 112^\circ - 32^\circ = 36^\circ$ (this is $\angle Y$)
Step2: Identify opposite angles/sides
- $32^\circ$ opposite $XZ$
- $36^\circ$ opposite $YZ$
- $112^\circ$ opposite $XY$
Step3: Order angles smallest to largest
$32^\circ < 36^\circ < 112^\circ$
Step4: Match to opposite sides
$32^\circ < 36^\circ < 112^\circ \implies XZ < YZ < XY$
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Problem 15:
Step1: Calculate missing angle
Sum of angles in triangle: $180^\circ - 127^\circ - 29^\circ = 24^\circ$ (this is $\angle M$)
Step2: Identify opposite angles/sides
- $24^\circ$ opposite $NP$
- $29^\circ$ opposite $MN$
- $127^\circ$ opposite $MP$
Step3: Order angles smallest to largest
$24^\circ < 29^\circ < 127^\circ$
Step4: Match to opposite sides
$24^\circ < 29^\circ < 127^\circ \implies NP < MN < MP$
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Problem 16:
Step1: Calculate missing angle
Right angle is $90^\circ$, so missing angle: $180^\circ - 90^\circ - 33^\circ = 57^\circ$ (this is $\angle D$)
Step2: Identify opposite angles/sides
- $33^\circ$ opposite $FD$
- $57^\circ$ opposite $FI$
- $90^\circ$ opposite $DI$
Step3: Order angles smallest to largest
$33^\circ < 57^\circ < 90^\circ$
Step4: Match to opposite sides
$33^\circ < 57^\circ < 90^\circ \implies FD < FI < DI$
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- $AB < BC < AC$
- $XZ < YZ < XY$
- $NP < MN < MP$
- $FD < FI < DI$