Question

In ∆PQR,M is the midpoint of side QR. The line segment PM is

a:angle bisector b:median
c:altitude d:hypotenuse

Answer 1

$\textsf{Concept used:}$

$\textsf{Median:}$

$\textsf{A median of triangle is a line segment which joins }$

$\textsf{one of the vertex of the triangle to the midpoint of the opposite side}$

$\textsf{The point of intersection of medians of a triangle is called Centroid }$

$\textsf{Here, M is the midpoint of QR}$

$\textsf{Hence PM is a median of \triangle PQR}$

$\implies\textsf{Option (b) is correct}$

Find more:

QT and RS are medians of a triangle PQR right angled at P prove that a (QT square + RS square ) = 5 QR square​

https://brainly.in/question/8529534#