Given the triangle PQR
m∠RPQ = 60
m∠PQR = q
m∠QRP = r
And, PQ > QR
We will check the options:
A) PR = PQ (wrong, there is no information to prove it)
B) PR < QR
From the condition PQ > QR ⇒ m∠QRP > m∠RPQ
So, r > 60
As the sum of the angles = 180
So, r + q = 120
But r > 60
So, q < 60
So, q < r
And as a conclusion: PR < QR and PR < PQ
So, the statement is true
So, the answer will be option B) PR < QR