A 35ft. ladder is
leaning against a
wall. The ladder and
the wall form a 52°
angle. How far is the
base of the ladder
from the bottom of
the wall? Find the
area of the triangle.
A ladder reaches
27ft. up a wall. The
angle between the
base of the ladder
and the ground is
64°. How long is the
ladder? Find the
area of the triangle.
The base of a
ladder is 43in.
from the
bottom of a
wall. The
ladder and the
ground form a
70° angle.
How high up
the wall does
the ladder
reach? Find the
area of the
triangle.
A flagpole casts
an 18ft. shadow.
The angle of
elevation from
the end of the
shadow to the
top of the
flagpole is 37°.
How tall is the
flagpole? Find
the area of the
triangle.
The distance from
the top of a flagpole
to the end of the
shadow it casts is
52ft. The angle of
depression from the
top of the flagpole to
the end of the
shadow is 55°. How
long is the shadow?
Find the area of the
triangle.
A flagpole is 10m
tall. What is the
distance from the
top of the flagpole
to the end of the
shadow it casts if
the angle between
these two distances
is 51°? Find the
area of the triangle.
Susie is
holding a kite
string 4ft. off
the ground. If
the kite string
is 18ft. long,
and it forms a
37° angle with
the ground,
how high is the
kite above the
ground? Find
the area of the
triangle.
Susie is standing
35ft. from the
spot on the
ground directly
below the kite
she is flying. If
Susie is holding
the kite string
5ft. off the
ground and the
angle of
elevation from
Susie to the kite
is 52°, how long
is the kite
string? Find the
area of the
triangle.
Susie is flying a kite
that is 55ft. above
the ground. If she is
holding the kite
string 3ft. above the
ground, at a 35°
angle to the ground,
what is the
horizontal distance
between Susie and
the kite? Find the
area of the triangle.
An airplane is flying
35mi. above the
ground. If the angle
of depression from
the plane to the
airport is 38°, what
is the horizontal
distance from the
airplane to the
airport? Find the
area of the triangle.
The angle of
elevation from
the end of a
runway to an
approaching
airplane is 64°.
If the straight
line (line of
sight) distance
to the airplane
is 27 miles,
how high is the
airplane? Find
the area of the
triangle.
ΔABC is equilateral.
The height of ΔABC is
√ in. What are the
area and perimeter of
ΔABC?
Given:
BE = 50 ft.
Area of EFGH is1600ft2
What are the area and perimeter of
the composite figure below?
An airplane is
approaching the
airport from 52
miles away. The
angle of
depression from
the airplane to
the airport is
55°. How high
is the airplane?
Find the area of
the triangle.
Find the
probability that
a bird will fly
inside the
square but
outside the
circle.
9ft
12 ft
Find the area of a
ABCD is an isosceles trapezoid.
regular pentagon
Find x. Find the area of the
with a side length of
trapezoid.
12 cm to the nearest
tenth of a centimeter.
A
2x + 2
B
The following
information
describes
rhombus LIVE.
Find x.

Diagonals intersect
at S
 IS = 40 cm
 LV = (20x + 32)
cm
 Area = 860 cm²
16
D
Find the area and
perimeter of the
following figure.
C
3X+5
ABCD is an isosceles trapezoid.
Find x. Find the area of the
trapezoid.
A
4x-1
B
15
D
2X +5
C
Each interior angle of Given the rhombus ABCD,
a regular polygon has Find mADC, and the Perimeter and
a measure of 157.5.
Area of ABCD.
How many sides does
it have?
The diagonals of
quadrilateral
EFGH intersect
at D (-2, 3).
Two vertices of
EFGH are
E (-8, 4) and
F (0, 6). What
must be the
coordinates of G
and H to ensure
that EFGH is a
parallelogram?
Explain/show
your reasoning,
using slope.
The sum of the
measures of the
interior angles
of a convex
polygon is ten
times the sum of
the measures of
its exterior
angles. Find the
number of sides
of the polygon.