OE

But, 0.3*0.2 = 0.06

True sir

You are perfectly correct. The book has a typo.

I edited the OA

I was just pointing out your calculation error.

But your logic is still wrong.
The question asks for "at least one", and you are determining the probability of both simultaneously.

Given:
P(Hank hits home run) = 0.3, which means P(Hank does NOT hit home run) = 1 - 0.3 = 0.7
P(Babe hits home run) = 0.2, which means P(Babe does NOT hit home run) = 1 - 0.2 = 0.8

When it comes to probability questions involving "at least," it's best to try using the complement.
That is, P(Event A happening) = 1 - P(Event A not happening)
So, here we get: P(at least 1 home run) = 1 - P(not getting at least 1 home run)
So, we can write: P(getting at least 1 home run) = 1 - P(getting zero home runs)

P(getting zero home runs)
P(getting zero home runs) = (Hank does not get a home run AND Babe does not get a home run)
= (Hank does not get a home run) x P(Babe does not get a home run)
= 0.7 x 0.8
= 0.56

So, P(getting at least 1 home run) = 1 - 0.56 = 0.44

You're absolutely right. I have changed the official answer to 0.44

We just subtract both not hitting a home run from 1 (total of all probabilities).
1-0.7*0.8=0.44.