If you are looking for the diagonal through the box from top left vertex to bottom right vertex...Or...you are looking for the diagonal through the bottom of the box, you would use which of these theorems?
a
Pythagorean Theorem
b
Exterior Angle Theorem
c
Triangle Sum Theorem
d
Interior Angle Theorem
How would you find the slant height or edge length of the ice cream cone?
a
\large 1^2+b^2=5^2;b=4.9
b
\large 1^2+b^2=5^2;b=2
c
\large 1^2+5^2=c^2;c\approx5.1
d
\large 1^2+5^2=c^2;c=6
To find d , the diagonal through the box, which would be the best idea to use?
a
Find d, the diagonal of the box, using the Pythagorean Theorem with sides 20 and 6. Then, use the Pythagorean Theorem again with sides d and 6 to solve for s.
b
Find s, the diagonal of the bottom of the box, using the Pythagorean Theorem with sides 6 and 6. Then, use the Pythagorean Theorem again with sides s and 20 to solve for d.
c
Find s, the diagonal of the bottom of the box, using the Interior Angle Theorem with sides 20 and 6. Then, use the Interior Angle Theorem again with sides s and 6 to solve for d.
d
Find s, the diagonal of the bottom of the box, using the Pythagorean Theorem with sides 20 and 6. Then, use the Pythagorean Theorem again with sides s and 6 to solve for d.
Solve for d, the diagonal through the box.
a
\large d=\sqrt{32}
b
\large d=\sqrt{472}
c
\large d=\sqrt{26}
d
\large d=\sqrt{436}
What is the length of the diameter of the base of the cone?
a
56 cm
b
112 cm
c
139 cm
d
278 cm
To find the volume of a Cylinder, we would use this formula: \large V=\Pi r^2h
We would need to know 3 different dimensions to find the volume.
True; a cylinder is 3 dimensional with 3 different dimensions
False; a cylinder is 3 dimensional with 2 of the dimensions being the same.
If the Volume of the cylinder = 90π ft^3 and the altitude = 10 ft. what is the radius of the cylinder?
a
30 ft
b
3 ft
c
1 ft
d
9 ft
Which number is IRRATIONAL?
a
√36
b
√44
c
√81
d
√144
Which number is RATIONAL?
a
0.121314151617....
b
0.123223233423....
c
0.123456789.....
d
0.123123123......
Which number set includes only RATIONAL numbers?
a
{-66/7, 0, 0.13, √45, 98/5 }
b
{-0.123123...., 0, π/2, √100, 77/4}
c
{-2/3, 0, 0.321, √49, 101/3 }
d
{-4/5, 0, 0.121314..., 97/3}
Which number cannot be written as a ratio of Integers?
a
√121
b
0.14444444.....
c
0.125
d
0.14151617...