Use multiplication to expand the expression below. Then compute and/or simplify.
(4b) ^3
Press the dot⋅ button or type the * symbol on your keyboard to represent multiplication. Using times× for multiplication is inappropriate when xx may be used as a variable. For the answer, type the base, then use the a, to the power ba b
button or type the ^ symbol for an exponent.
Expanded form:
Answer:
7 answers
The expanded form of (4b) ^3 is 64b^3.
whats the answer for the 2nd thing tho?
The answer for the simplified form of (4b) ^3 is 64b^3.
I tried both it says "You have made a mistake find it. Two more chances left"
Apologies for the confusion. Let's go through the simplification process step by step.
To simplify (4b) ^3, we need to multiply the base (4b) by itself three times.
(4b) ^3 = (4b) × (4b) × (4b)
Using the distributive property of multiplication, we can simplify this expression:
(4b) × (4b) × (4b) = 4 × 4 × 4 × b × b × b
Now we can simplify the numerical part:
4 × 4 × 4 = 64
And simplify the variables:
b × b × b = b^3
Putting it together, the simplified form is:
(4b) ^3 = 64b^3
To simplify (4b) ^3, we need to multiply the base (4b) by itself three times.
(4b) ^3 = (4b) × (4b) × (4b)
Using the distributive property of multiplication, we can simplify this expression:
(4b) × (4b) × (4b) = 4 × 4 × 4 × b × b × b
Now we can simplify the numerical part:
4 × 4 × 4 = 64
And simplify the variables:
b × b × b = b^3
Putting it together, the simplified form is:
(4b) ^3 = 64b^3
add Expanded form please
Apologies for the oversight. Here is the expanded form:
(4b) ^3 = (4b) × (4b) × (4b) = 4 × 4 × 4 × b × b × b = 64b^3
(4b) ^3 = (4b) × (4b) × (4b) = 4 × 4 × 4 × b × b × b = 64b^3
1 answer