the diagram shows a gizmo where a cylinder is connected to a hemisphere with the same radius
the gizmo is held vertically by a thin straight rod which is connected to a horizontal plate and the top of the rim of the cylinder
the total volume of the gizmo is 9.2cm³
the radius of the hemisphere and cylinder is 0.8cm
calculate the length of the rod
angle on rod and plate=72˚
another angle is 90˚

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Respuesta :

demiakoms0 demiakoms0 · Answer 1 · 2020-04-06T16:51:42+02:00

Answer:

5.1cm

Step-by-step explanation:

volume of hemisphere = 1.07cm³

9.2-1.07 = 8.13

volume of cylinders = 8.13cm³

height of cylinder = 4.04cm

total height of gizmo = 4.04+0.8=4.84

4.84/sin(72) = 5.1cm

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azikennamdi azikennamdi · Answer 2 · 2022-04-05T14:40:23+02:00

The length of the rod based on the information provided is equal to 5.1 Centimeters. See calculation below.

Recall that the Volume of the Hemisphere has been given as: 1.07 cm³; and

To arrive at the volume of the Cylinder, we must subtract the volume of the Hemisphere from the volume of the Gizmo.

Hence: 9.2 - 1.07 = 8.13cm ³

To get the height of the cylinder, we deploy the formula for calculating the volume of a cylinder which is:

V = πr2h.

Hence, H = V/πr2

= 4.04 cm

Total height therefore, of the Gizmo = 4.04 + 0.8 = 4.84/

Therefore, the length of the rod =

4.84/Sin (72) = 5.1 cm.

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