Apply the Zero Power Rule to create an equivalent expression to 9⋅(−33)^0+3/2(8 − 27^0)
9⋅(−33)^0+3/2(8 − 27^0) = A . B + 3/2 ( C - D )
Using the Zero Power Rule, any number (except for 0) raised to the power of 0 is equal to 1. Therefore, (-33)^0 = 1.
9⋅(−33)^0 + 3/2(8 − 27^0) can be simplified as:
9⋅1 + 3/2(8 - 1)
which further simplifies to:
9 + 3/2(7)
Then, applying the distributive property:
9 + (3/2)(7)
Multiplying 3/2 by 7:
9 + 21/2
Combining the two terms:
9+ 10.5
Adding:
19.5
Therefore, the equivalent expression is:
19.5
whats A
In the expression 9⋅(−33)^0 + 3/2(8 − 27^0), A represents the value of 9⋅(−33)^0.
9⋅(−33)^0+3/2(8 − 27^0) = A . B + 3/2 ( C - D )
what is A B C D
In the expression 9⋅(−33)^0+3/2(8 − 27^0) = A . B + 3/2 ( C - D ), the values of A, B, C, and D are:
A = 9
B = (-33)^0 = 1
C = 8
D = 27^0 = 1
so b is not 3/2
Apologies for the confusion.
In the expression 9⋅(−33)^0+3/2(8 − 27^0) = A . B + 3/2 ( C - D ), the values of A, B, C, and D are:
A = 9
B = (-33)^0 = 1
C = 8
D = 27^0 = 1
Apologies for the misunderstanding in the initial response. B is indeed 1 in this case.
15⋅8^0/5 + 4(7^0 − 6)=
To simplify the expression 15⋅8^0/5 + 4(7^0 − 6), let's start by evaluating the exponential terms:
8^0 = 1
7^0 = 1
Now we can simplify the expression further:
15⋅8^0/5 + 4(7^0 − 6)
= 15⋅1/5 + 4(1 − 6)
= 15/5 + 4(-5)
= 3 + (-20)
= -17
Therefore, the simplified expression is -17.