What is the formula for finding the sum of the interior angles of a regular polygon?
What regular polygon has an interior angle sum of 1440 degrees?
What is measure of one of those interior angles?
Find the value of x.
x=
Find the value of x.
x=
If PQRS is a parallelogram, find the length of QR
x=
y=
∠P=
∠S=
QR=
PQRS is a rectangle, ST= 12, and m∠PRS= 23, find each measure.
SQ=
PR=
m∠PSR=
m∠SQR=
m∠QPR=
m∠PTQ=
JKLMis a rhombus, MK= 30, NL= 13, and m∠MKL= 41, find each measure.
NK=
JL=
KL=
m∠JKM=
m∠JML=
m∠MLK=
m∠MNL=
m∠KJL=
If STUV is a rhombus, find m∠SVU.
x=
m∠SVU=
WXYZ is a square with WZ= 27, find each measure.
ZY=
WY=
RX=
m∠WRZ=
m∠XYZ=
m∠ZWY=
PQRS is a Trapezoid. Find each measure.
m∠Q=
m∠S =
PQRS is a Trapezoid. Find each measure.
m∠E=
m∠F=
m∠G=
GHIJ is a trapezoid. Solve for x
GHIJ is a trapezoid. Solve for x
x=
∠G=
∠H=
TRAP is a trapezoid. Solve for x
TRAP is a trapezoid. Solve for x
TRAP is a trapezoid. Solve for x
x=
TR=
AP=
TRAP is a trapezoid. Solve for x
x=
MD=
TR=
If △ABC is an equilateral triangle, solve for both x and y.
x=
y=
Find the measure of the indicated angle.
Find the length of the indicated side.
Find the measure of the indicated angle.
Find the measure of the indicated angle.
Find each missing angle measures.
x=
m∠A=
Find each missing angle measures.
x=
m∠A=
Find each missing angle measures.
x=
m∠A=
Find each missing angle measures.
x=
m∠A=
Find each missing angle measures.
x=
m∠1=
m∠2=
m∠3=
m∠4=
m∠5=
Given two sides of a triangle, you can set up an inequality using the sum and difference to show the range of possible lengths for the third side:
13 and 21
a) Set up difference and sum that shows the possible range of side lengths for the third side
b) Write the inequality the shows the range of lengths that could be a third side this triangle:
Given two sides of a triangle, you can set up an inequality using the sum and difference to show the range of possible lengths for the third side:
41 and 36
a) Set up difference and sum that shows the possible range of side lengths for the third side
b) Write the inequality the shows the range of lengths that could be a third side this triangle:
How many integer values of x are there so that x, 4, and 11 could be the lengths of the sides of a triangle?
How many integer values of x are there so that x, 18, and 11 could be the lengths of the sides of a triangle?