If the radius of a solid object increases 2 times the volume of the object would increase how many times
If the radius of a solid object increases 2 times the volume of the object would...
1) If the radius of a star increases by a factor of 6 the surface area of the star increases how many times? 2) If the radius of a solid object increases 6 times, the volume of the object will increase how many times?
If you double the radius of an ordinary (non-fractal) solid rubber ball, the mass of the ball increases how many times? Question 2 options: 2 4 8 16 1/2
A lead object and a quartz object each have the same initial volume. The volume of each increases by the same amount, because the temperature increases. If the temperature of the lead object increases by 3.5 °C, by how much does the temperature of the quartz object increase? (The coefficient of volume expansion for lead is 8.70 × 10 − 5 o C − 1 and that one for quartz is 1.50 × 10 − 6 o C − 1...
A lead object and a quartz object each have the same initial volume. The volume of each increases by the same amount, because the temperature increases. If the temperature of the lead object increases by 4.3 °C, by how much does the temperature of the quartz object increase? (The coefficient of volume expansion for lead is 8.70×10−58.70×10−5 oC−1oC−1 and that one for quartz is 1.50×10−61.50×10−6 oC−1oC−1 ) the answer is not 249.4
When the temperature of a certain solid, rectangular object increases by Delta T, the length of one side of the object increases by 0.010% = 1.0 10^-4 of the original length. The increase in volume of the object due to this temperature increase is A. 0.01% = 1.0 10^-4 of the original volume. B. (0.010)^3 % = 0.0000010% = 1.0 10^-4 of the original volume. C. (1.0 10^-4)^3 = 0.0000000001% = 1.0 10^-12 of the original volume. D. 0.030% =...
Suppose an object is launched from Earth with 0.52 times the escape speed. How many multiples of Earth's radius (RE 6.37 x 106 m) in radial distance will the object reach before falling back toward Earth? The distances are measured relative to Earth's center, so a ratio of 1.00 would correspond to an object on Earth's surface. For this problem, neglect Earth's rotation and the effect of its atmosphere For reference, Earth's mass is 5.972 x1024 kg. Your answer is...
You are measuring the density of a solid object by displacement. The volume of water in the cylinder initially is 30.7 (plusminus 0.3 mL) and the volume after the solid metal sample sank was 34.5 (plusminus 0.3 mL). Find the volume of the metal sample and calculate the uncertainty in the volume reading. Remember to retain one extra sig fig for the next calculation.
Problem 3: Consider two cylindrical objects of the same mass and radius. Object A is a solid cylinder, whereas object B is a hollow cylinder.Part (a) If these objects roll without slipping down a ramp, which one will reach the bottom of the ramp first? Part (b) How fast, in meters per second, is object A moving at the end of the ramp if it's mass is 210 g, it's radius 14 cm, and the height of the beginning of the ramp is 13.5...
A cone is 4 times as tall as the radius of the base. a.)Give volume as a function of radius b.)Give radius as a function of volume c.) Give volume as a function of height d.) Give height as a function of volume
3. An object moves at constant speed v in a circle of radius r. How many times greateriless is the acceleration (a) if v is doubled, (b) if r is doubled? What happens to the acceleration as r-oo? as r→0? Why can't a car turn a corner instantaneously (in no time)-how great would the acceleration have to be?