Question

Pogoda
an
the
given figure, Ps is the Median
then
LQ PS 2
:P
Q
S
R​

Answer 1

Answer:

Step-by-step explanation:

In figure PS is the median

Triangle PTS is a right angled triangle.

Therefore according to figure angle PTS is a right angle.

Therefore both the anlge that is angle TPS and angle TSP are not right angles but both of them are acute angles.

Therefore if angle TSP is acute then angle PSR has to be an obtuse angle.

Consider triangle PTR

angle PSR is an obtuse angle which I already proved.

There is a theorem which states relation between side opposite to obtuse angle with two remaining sides.

According to that theorem

PR^2 = SR^2 + PS^2 + 2SR*ST

It can be rewritten as

PR^2 = PS^2 + QR*ST + (QR/2)^2

SR^2 is rewritten as (QR/2)^2 and 2SR is rewritten as QR

Hence, proved.

Hope it helps.

Answer 2

Answer:

nhi pata

Step-by-step explanation:

fhljfdgkklljcss bjjhgf