If arc PQ,QR,AND PR ARE MINOR ARCS THEN TRIANGLE PQR IS A ----TRIANGLE ,ACUTE OR OBTUSE
Urgent plse
if segment PR is a diameter of the circle, PQR is a right triangle.
So, if arc PR is also a minor arc, then PQR is obtuse.
But here all PQ, QR and PR are minor arcs??
obtuse
To determine whether triangle PQR is acute or obtuse, we need to examine the angles of the triangle.
Minor arcs PQ, QR, and PR represent three arcs on a circle. In a circle, the length of a minor arc is less than half the circumference of the circle, meaning the measures of these arcs are less than 180 degrees.
In triangle PQR, we need to consider the three angles formed. Let's label them as angle P, angle Q, and angle R.
Since arcs PQ, QR, and PR are minor arcs, the corresponding angles P, Q, and R in triangle PQR will be the central angles of the respective arcs.
Now, if an arc has a measure less than 180 degrees, the angle subtended by that arc will also be less than 180 degrees. Therefore, angle P, angle Q, and angle R will all be less than 180 degrees.
If all the angles in a triangle are less than 90 degrees, then the triangle is classified as an acute triangle. If one angle is greater than 90 degrees, then the triangle is classified as an obtuse triangle.
Since we have confirmed that all angles P, Q, and R are less than 180 degrees, triangle PQR is an acute triangle.
Therefore, the answer is: Triangle PQR is an acute triangle.