Answer:
Length of side QR is 16 units.
Step-by-step explanation:
Given that dimensions of [tex]\triangle PQR[/tex] are as follows:
[tex]\angle QPR =90^\circ[/tex]
Side QP [tex]= 8 \sqrt3\ units[/tex]
Side PR = 8 units
To find, side QR = ? units
Please refer to the attached figure for the representation of the given dimensions.
Base is side QP,
Perpendicular is side PR and
Hypotenuse is side QR.
In a right angled triangle, Pythagorean theorem holds true i.e.
Accoring to pythagoras theorem:
[tex]\text{Hypotenuse}^{2} = \text{Base}^{2} + \text{Perpendicular}^{2}[/tex]
[tex]\Rightarrow QR^{2} = QP^{2} + PR^{2}[/tex]
Putting the values of QP and PR:
[tex]\Rightarrow QR^{2} = (8\sqrt3)^{2} + 8^{2}\\\Rightarrow QR^{2} = 64 \times 3+ 64\\\Rightarrow QR^{2} = 64 \times 4\\\Rightarrow QR = 8 \times 2\\\Rightarrow QR = 16\ units[/tex]
So, the value of length of side QR is 16 units.
