cahill8
Oct14-11, 02:47 AM
When a stars radial velocity is measured in search for a planet, the planet imparts a radial velocity shift proportional to m\sin i\text{ where }i is the orbital inclination of the planet with respect to our line of sight and m is the planet mass. I've heard that even though the inclinations are generally unknown, the true masses can be approximated for a large sample by multiplying m\sin i values by 1.33. I'm wondering where this value comes from?
Assuming a uniform distribution of i, \int^\pi_0 \sin i di/\pi gives a value of 2/\pi implying that the m\sin i should be multiplied by \pi/2 (1.57, opposed to the 1.33 I've seen). Does anyone have a derivation or reference for this number?
Thanks
Assuming a uniform distribution of i, \int^\pi_0 \sin i di/\pi gives a value of 2/\pi implying that the m\sin i should be multiplied by \pi/2 (1.57, opposed to the 1.33 I've seen). Does anyone have a derivation or reference for this number?
Thanks