If Hubble's constant were to increase, it would mean that the rate at which the universe is expanding is also increasing. This could have implications for the age and size of the universe, as well as the eventual fate of the cosmos. Additionally, it could potentially impact our understanding of dark energy and the overall structure of the universe.
When you increase the speed while keeping mass constant, the kinetic energy increases. Kinetic energy is directly proportional to the square of the velocity, so as speed increases, kinetic energy increases even more rapidly.
at constant temperature in a closedcontainer the increase in temperature increases the volume of a gas but not the mass.
An arithmetic sequence is a numerical pattern where each term increases or decreases by a constant value. This constant value is called the common difference.
It will increase? No it will decrease when the same amount of gas is held at constant temperature.
The kinetic energy of the particle increases as the speed increases, following the equation ( KE = \frac{1}{2} mv^2 ) where ( KE ) is the kinetic energy, ( m ) is the mass of the particle, and ( v ) is the speed of the particle. The energy of the particle is converted to kinetic energy as its speed increases.
Volume increases
The rate constant decreases.
The velocity increases at a constant rate.
Acceleration increases
When the Temperature increases, so does the Pressure.
If the frequency remains constant, then the wavelength increases.
Force increases.
it also increases in the same proportion as stress. Stress equals strain times a constant, where the constant is Young's modulus. This is Hooke's Law
In the short run nothing happens to price
If temperature remains constant and the volume of gas increases, the pressure will decrease. This is described by Boyle's Law, which states that pressure and volume are inversely proportional when temperature is constant.
By using a therom call hubbles law and hubbles constant this is the calculation: 1/Ho=d/v=t t= 3.09x10 22/71000x31566926 t=13.738 billion years old
When the temperature of a gas is increased at a constant pressure, its volume increases. When the temperature of a gas is devreased at constnt pressure, its volume decreases.