The area increase by four times.
None. There is no perfect square that, when doubled, equals 60.
When the dimensions of a cube are doubled, each side length increases from ( s ) to ( 2s ). The surface area of a cube is calculated as ( 6s^2 ); therefore, the new surface area becomes ( 6(2s)^2 = 6 \times 4s^2 = 24s^2 ). This shows that the new surface area is four times greater than the original surface area of ( 6s^2 ). Hence, when the dimensions are doubled, the surface area indeed increases by a factor of four.
Fourteen times two divided by 2 then times four is equal to 56.
Two times eighty four is one hundred and sixty four
If the sides of a triangle are doubled then the area becomes quadrupled (four times as large).
The area increase by four times.
One doubled once is 1*2. One doubled twice is 1*22. One doubled three time is 1*23=8.... One doubled 64 times is 1*264=264, or approximately 1.84*1019, or 18.4 quintillion.
four times the initial value
It will increase to four times as much.
The area will be four times larger because both the length and the width of the original shape were doubled in size. Thus, each dimension was multiplied by a factor of two, resulting in an overall increase of four.
Times one, doubled, times one, doubled...
four times. Kinetic energy is directly proportional to the square of the velocity of an object, so if the velocity is doubled, the kinetic energy will be four times greater.
When a car's speed is doubled, its kinetic energy increases by a factor of four. This is because kinetic energy is proportional to the square of the velocity.
doubled! I just got it right! =]
Two times larger.
None. There is no perfect square that, when doubled, equals 60.