Answer:
The arrangement of the sides in order from shortest to longest is PR , QR , PQ .
Step-by-step explanation:
Consider the given triangle PQR, with ∠P = (12n-9)° , ∠Q = (62-3n)°
and ∠R = (16n+2)°.
We have to arrange the sides in order from shortest to longest.
Side opposite to the largest angle is the longest.
But to apply this, we first need to find the measure of each angle,
We know, Angle sum property of a triangle states that "the sum of angles of a triangle is equal to 180°".
∠P + ∠Q + ∠R = 180°
Substitute the values, we get,
(12n-9)° + (62-3n)° + (16n+2)° = 180°
Combining same terms together, we get,
⇒ 12n -3n+16n + 62 -9 +2 = 180
⇒ 25n + 55 = 180
⇒ 25n = 180 - 55
⇒ 25 n = 125
⇒ n = 5
Thus, ∠P = (12n-9)° = (12(5)-9) = 51°
∠Q = (62-3n)° = (62-3(5))° = 47°
and ∠R = (16n+2)° = (16(5)+2)° = 82°
Thus, ∠R is the greatest angle. thus side opposite to ∠R is longest that is PQ is longest.
Then ∠P is the middle angle , so side opposite to ∠P is Middle that is QR is middle.
Then ∠Q is the smallest angle , so side opposite to ∠Q is smallest that is PR is smallest.
Thus, The arrangement of the sides in order from shortest to longest is PR , QR , PQ .
