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Volume of the largest possible right circular cylinder that can be inscribed in a sphere of radius a?
volume of a regular right circular cylinder is V=pi(r2)h
since the radius is (a) then the height of the circular cylinder would be (2a)
so the volume of the largest possible right circular cylinder is...
V=2(pi)(r2)(a)
with (pi) being 3.14159
with (r) being the radius of the circle on the top and bottom of the cylinder
with (a) being the radius of the sphere
What else can I help you with?
Find the dimensions of the rectangle of largest area that can be inscribed in a circle of radius a in C programming?
Find the dimensions of the rectangle of largest area that can be inscribed in a circle of radius a in C programming
The largest sphere to be curved out of a right circular cylinder of radius 7centimeter and height 14centimeter. Find the volume of the sphere.?
Let the radius of the largest sphere that can be carved out of the cube be r cm.The largest sphere which can be carved out of a cube touches all the faces of the cube.∴ Diameter of the largest sphere = Edge of the cube⇒ 2r = 7 cm∴ Volume of the largest sphere
What is the largest angle possible on a triangle?
90
What is the volume of the largest cylinder that can be cut from a metal cube with an edge of 12 m?
1357.2
What do the wedges in circular graphs mean?
If you're talking about a pie chart, each wedge in the circle is demonstrating a percentage. The largest wedge would be the largest percentage, the smallest would be the smallest percentage.
Largest volume of a cylinder inscribed in a cone of semivertical angle x?
(4/27)*pi*R3*tan(x) R being the radius of the base of the cone.
Find the dimensions of the rectangle of largest area that can be inscribed in a circle of radius a in C programming?
Find the dimensions of the rectangle of largest area that can be inscribed in a circle of radius a in C programming
What is the area of the rectangle of largest area that can be inscribed in a circle of radius r?
It is 2*r^2.
The largest sphere to be curved out of a right circular cylinder of radius 7centimeter and height 14centimeter. Find the volume of the sphere.?
Let the radius of the largest sphere that can be carved out of the cube be r cm.The largest sphere which can be carved out of a cube touches all the faces of the cube.∴ Diameter of the largest sphere = Edge of the cube⇒ 2r = 7 cm∴ Volume of the largest sphere
If a backyard is a square that measures 20 feet on each side what is the largest circular garden possible to fit in the backyard?
The biggest diameter that would fit is 20 ft.
What is the largest and smallest volume your graduated cylinder can measure?
The answer depends on the cylinder.
Find the dimensions of the rectangle of largest area that can be inscribed in a circle of radius a?
The largest rectangle would be a square. If the circle has radius a, the diameter is 2a. This diameter would also be the diameter of a square of side length b. Using the Pythagorean theorem, b2 + b2 = (2a)2. 2b2 = 4a2 b2 = 2a2 b = √(2a2) or a√2 = the length of the sides of the square The area of a square of side length b is therefore (√(2a2))2 = 2a2 which is the largest area for a rectangle inscribed in a circle of radius a.
What is the volume of the largest cylinder with circular base that can be inscribed in a cube whose volume is 64 cubic centimeter?
First, let us find the height of one side of the cube, we have; S= cube root of 64 S= 4. Since the diameter is 4 cm, the radius will be 2 cm. now, solve it by using the formula: V= PI.r squared . h V= 3.14. 2 cm squared. 4 cm V= 3.14. 16 v=50.24 cubic centimeter
Find the dimensions of the rectangle of largest area that can be inscribed in a circle of radius 4 inches?
Approximately 5.66x5.66 in. Or root32 x root32
What is the largest remainder possible if the divisor is 10?
What is the largest remainder possible if the divisor is 10
What is the largest volume of a liquid a graduated cylinder can hold?
100ml
What is a cynosure of Pi?
A circle with a diameter of 2 is the guiding cynosure when Pi is the square of all possible circles: If the square root of Pi defines the side of a square and that square can be inscribed within a circle or enclose a circle, then the diameters of all possible circles between the largest and smallest include the circle of which Pi is its perfect square (a diameter of 2).
