All Common Core: High School - Geometry Resources
Example Questions
Example Question #1 : Circumference And Area Of A Circle, Volume Of A Cylinder, Pyramid, And Cone Formulas: Ccss.Math.Content.Hsg Gmd.A.1
If a circle has a circumference of what is the radius?
In order to find the radius of a circle, we need to recall the equation that involves both the radius and circumference.
Since we are given the circumference, we simply substitute 33 for , and solve for .
Divide by on each side to get
Thus the radius is
Example Question #2 : Circumference And Area Of A Circle, Volume Of A Cylinder, Pyramid, And Cone Formulas: Ccss.Math.Content.Hsg Gmd.A.1
If a cylinder has a radius of and a height of what is the volume?
In order to find the volume, we need to recall the equation for the volume of a cylinder.
Since we are given the radius, and the height, we can simply plug in those values into the equation.
Thus the volume is
Example Question #3 : Circumference And Area Of A Circle, Volume Of A Cylinder, Pyramid, And Cone Formulas: Ccss.Math.Content.Hsg Gmd.A.1
If a cylinder has a radius of and a height of what is the volume?
In order to find the volume, we need to recall the equation for the volume of a cylinder.
Since we are given the radius, and the height, we can simply plug in those values into the equation.
Thus the volume is
Example Question #4 : Circumference And Area Of A Circle, Volume Of A Cylinder, Pyramid, And Cone Formulas: Ccss.Math.Content.Hsg Gmd.A.1
If a cylinder has a radius of and a height of what is the volume?
In order to find the volume, we need to recall the equation for the volume of a cylinder.
Since we are given the radius, and the height, we can simply plug in those values into the equation.
Thus the volume is
Example Question #5 : Circumference And Area Of A Circle, Volume Of A Cylinder, Pyramid, And Cone Formulas: Ccss.Math.Content.Hsg Gmd.A.1
If a cylinder has a volume of and a radius of what is the height?
In order to find the height, we need to recall the equation for the volume of a cylinder.
Since we are given the volume, and the radius, we can simply plug in those values into the equation.
Thus the height is
Example Question #6 : Circumference And Area Of A Circle, Volume Of A Cylinder, Pyramid, And Cone Formulas: Ccss.Math.Content.Hsg Gmd.A.1
If a cone has a radius of and a height of what is the volume?
In order to find the volume, we need to recall the equation for the volume of a cone.
Since we are given the radius, and the height, we can simply plug in those values into the equation.
Thus the volume is
Example Question #7 : Circumference And Area Of A Circle, Volume Of A Cylinder, Pyramid, And Cone Formulas: Ccss.Math.Content.Hsg Gmd.A.1
If a cone has a volume of and a radius of what is the height?
In order to find the height, we need to recall the equation for the volume of a cone.
Since we are given the volume, and the radius, we can simply plug in those values into the equation.
Thus the height is
Example Question #8 : Circumference And Area Of A Circle, Volume Of A Cylinder, Pyramid, And Cone Formulas: Ccss.Math.Content.Hsg Gmd.A.1
If a pyramid has a base width of a base length of and a volume of what is the height?
In order to find the height, we need to recall the equation for the volume of a pyramid,
Since we are given the length, width, and volume, we can simply plug those values into the equation.
Now we solve for .
Thus the height is
Example Question #9 : Circumference And Area Of A Circle, Volume Of A Cylinder, Pyramid, And Cone Formulas: Ccss.Math.Content.Hsg Gmd.A.1
If a cylinder has a volume of and a radius of what is the height?
In order to find the height, we need to recall the equation for the volume of a cylinder.
Since we are given the volume, and the radius, we can simply plug in those values into the equation.
Thus the height is
Example Question #10 : Circumference And Area Of A Circle, Volume Of A Cylinder, Pyramid, And Cone Formulas: Ccss.Math.Content.Hsg Gmd.A.1
If a cylinder has a volume of and a radius of what is the height?
In order to find the height, we need to recall the equation for the volume of a cylinder.
Since we are given the volume, and the radius, we can simply plug in those values into the equation.
Thus the height is