There are one blue, two black and three yellow balls. Two balls are randomly chosen without replacement. Define the following events: https://webwork.csun.edu/webwork2_fi...b0d93a0fa1.png One of the balls is blue https://webwork.csun.edu/webwork2_fi...b2486fbc61.png

https://webwork.csun.edu/webwork2_fi...da004df331.png At least one ball is black https://webwork.csun.edu/webwork2_fi...b2486fbc61.png

https://webwork.csun.edu/webwork2_fi...2ba54e6b21.png Both balls are yellow https://webwork.csun.edu/webwork2_fi...b2486fbc61.png

https://webwork.csun.edu/webwork2_fi...295115f201.png Both balls are of the same color https://webwork.csun.edu/webwork2_fi...b2486fbc61.png

Find the following conditional probabilities:

(a) https://webwork.csun.edu/webwork2_fi...8f1ec3f651.png https://webwork.csun.edu/webwork2_fi...1b687e8b31.png https://webwork.csun.edu/webwork2_fi...bf9402a711.png

(b) https://webwork.csun.edu/webwork2_fi...8f1ec3f651.png https://webwork.csun.edu/webwork2_fi...8572e853c1.png https://webwork.csun.edu/webwork2_fi...bf9402a711.png

(c) https://webwork.csun.edu/webwork2_fi...8f1ec3f651.png https://webwork.csun.edu/webwork2_fi...16c63ca561.png =

how can i solve this??