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Recessional velocity refers to the speed at which a galaxy moves away from Earth. This concept is a cornerstone of Hubble's Law, which highlights the expanding nature of the universe. To calculate the recessional velocity (\( v \)) of a galaxy, we use the formula: \[v = H_0 \times d\]

• Hubble constant ( \( H_0 \) ): a value that represents the rate of expansion of the universe (commonly about \( 70 \text{ km/s/Mpc} \)).
• Distance ( \( d \) ): the galaxy's distance from the Earth measured in megaparsecs (Mpc).

This velocity tells us how fast galaxies are moving away, indicating the continuous expansion of the cosmos. The larger the distance, the faster the galaxy appears to be moving away.

Redshift occurs when the light from a galaxy is stretched to longer wavelengths as the galaxy moves away from us. This shift is a visual clue of a galaxy's movement and speed.We calculate the redshift (\( z \)) using the formula:\[z = \frac{\lambda_{0} - \lambda_{s}}{\lambda_{s}}\]where:

• \( \lambda_{0} \): observed wavelength.
• \( \lambda_{s} \): source wavelength.

Another practical way to find redshift when the speeds are non-relativistic is by:\[z = \frac{v}{c}\]where:

• \( v \): the recession velocity.
• \( c \): the speed of light (approximately \(299792\text{ km/s}\)).

The redshift value helps astronomers measure how fast a galaxy is receding from Earth, and thus, how far back in time we are observing it.

Megaparsecs (Mpc) are a unit of distance commonly used in astronomy to measure large-scale distances in the universe. A parsec itself is defined by the distance at which one astronomical unit subtends an angle of one arcsecond, and is approximately \(3.26 \text{ light-years}\).1 Mpc is equivalent to 1 million parsecs, making it particularly useful for denoting intergalactic lengths. To convert from million light-years (Mly) to Mpc, one can use the conversion factor:\[\text{1 Mly} \approx 0.3066 \text{ Mpc}\]This means when we know the distance in million light-years, we multiply by \(0.3066\)to find the distance in megaparsecs.Megaparsecs help simplify calculations in astronomy, as they efficiently handle large numbers typical of cosmological measurements. This standardization plays a key role in utilizing Hubble’s Law effectively.