What is the solution of the interval notion?

x less than 6 and x greater than -3

The solution to the given interval notation, which states "x is less than 6 and greater than -3", can be found by finding the common range of values that satisfy both conditions.

1. The first condition states that "x is less than 6". This means that any value of x that is smaller than 6 will satisfy this condition. Therefore, we can represent this condition as x < 6.

2. The second condition states that "x is greater than -3". This means that any value of x that is larger than -3 will satisfy this condition. Therefore, we can represent this condition as x > -3.

To find the common range of values that satisfy both conditions, we need to find the intersection of the two sets of values:

x < 6 (Set A)
x > -3 (Set B)

To find the intersection, we compare the two conditions and find the range of values that satisfy both. In this case, the common range is x is greater than -3 and less than 6:

-3 < x < 6

Therefore, the solution to the given interval notation "x is less than 6 and greater than -3" is represented by the interval (-3, 6).