Let's say we have a set of toy cars

Let's say we have a set of toy cars (this is our "Universal Set") and
in our collection we have a fire truck, a red police car, a blue
pickup truck, an ambulance, a red sports car, a white tractor-trailer
rig and a blue station wagon.

We can make various sets out of them. Perhaps we want to organize our
collection by color. The Red set would have:

R = {fire truck, police car, sports car}

The Blue set would have:

B = {pickup truck, station wagon}

The White set would have:

W = {ambulance, tractor-trailer rig}

We can also organize our collection into trucks and cars. The Cars set
would have:

C = {police car, ambulance, sports car, station wagon}

while the Trucks set would have:

T = {fire truck, pickup truck, tractor-trailer rig}

If we wanted, we could also make a "set" out of the civil service
vehicles. This set would have:

S = {fire truck, police car, ambulance}

Now we have 6 different sets, all from the same collection of toys.
Suppose our best friend, Megan, asks us, "What red cars do you have?"
Well, our Red set (which we call R) has the fire truck, police car,
and sports car - but they're not all cars. Our set of Cars (which we
call C) has the police car, ambulance, sports car and station wagon
- but they're not all red. What Megan wants to know is what vehicles
in our collection are red AND are cars. A mathematician would call
this the "intersection of the sets R and C." Let's see:

R = {fire truck, police car, sports car}
C = {police car, ambulance, sports car, station wagon}

So what vehicles are in BOTH sets?

R^C = {police car, sports car}

I'm using the carat (^) symbol to represent intersection, or AND. Your
book might use an upside down U or a dot instead.

Our kid brother, Cyrus, likes vehicles with flashing lights, and he
also likes trucks. He asks us "What trucks do you have that are civil
service vehicles?" Well, our Truck set (which we call T) has the fire
truck, pickup truck and tractor-trailer rig - but they don't all have
flashing lights. Our set of civil service vehicles (which we call S)
has the fire truck, police car and ambulance - but they're not all
trucks. What Cyrus wants are vehicles that are civil service vehicles
AND trucks. A mathematician would call this the "intersection of the
sets S and T." Let's see:

S = {fire truck, police car, ambulance}
T = {fire truck, pickup truck, tractor-trailer rig}
So,
S^T = {fire truck}

After we give him the fire truck to play with, Cyrus complains "I want
a BLUE one!" So what Cyrus wants are trucks that are civil service
vehicles that also are blue, or the "intersection of the sets S and T
and B" in MathSpeak.

S = {fire truck, police car, ambulance}
T = {fire truck, pickup truck, tractor-trailer rig}
B = {pickup truck, station wagon}

What vehicles are in ALL THREE sets? None. We call that "the empty
set" (or the "null set"), so Cyrus is out of luck.

S^T^B = {}

I hope this helps. If you have any more questions, write back.