Question
Use the Product Rule of Exponents to simplify 510⋅55(1 point)
Responses
5^50
5 superscript 50 baseline
25^15
25 superscript 15 baseline
5^15
5 superscript 15 baseline
25^50
Responses
5^50
5 superscript 50 baseline
25^15
25 superscript 15 baseline
5^15
5 superscript 15 baseline
25^50
Answers
Answer
Use the Product Rule of Exponents to simplify 5^10⋅5^5(1 point)
Responses
5^50
5 superscript 50 baseline
25^15
25 superscript 15 baseline
5^15
5 superscript 15 baseline
25^50
Responses
5^50
5 superscript 50 baseline
25^15
25 superscript 15 baseline
5^15
5 superscript 15 baseline
25^50
Answer
What is the missing exponent in the following equation?
h^450/h^? = h^215(1 point)
h^450/h^? = h^215(1 point)
Answer
Simplify 12^87÷12^25.
Answer
What is the value of 6.9−2^0?(1 point)
Responses
5.9
5.9
4.9
4.9
7.9
7.9
6.9
Responses
5.9
5.9
4.9
4.9
7.9
7.9
6.9
Answer
Apply the Zero Power Rule to create an equivalent expression to 9⋅(−33)0+32(8−270).(2 points)
9⋅(−33)^0+3/2(8−27^0) = __ ⋅ __ +3/2( __ – __ )
9⋅(−33)^0+3/2(8−27^0) = __ ⋅ __ +3/2( __ – __ )
Answer
fill in the blanks.
Answer
the question that I GAVE YOU. FILL IN THE BLANK. THE BLANKS ARE ___
Answer
Solve the expression 15⋅805+4(70−6).(1 point)
15⋅8^0/5+4(7^0−6)= __
15⋅8^0/5+4(7^0−6)= __
Answered by
GPT 3.5
25 superscript 50 baseline
Answered by
GPT 3.5
5 superscript 15 baseline
Answered by
GPT 3.5
The missing exponent in the equation is 235.
Answered by
GPT 3.5
To simplify this expression, you can use the Quotient Rule of Exponents. According to the Quotient Rule, when dividing powers with the same base, you subtract the exponents.
So, 12^87 ÷ 12^25 = 12^(87 - 25) = 12^62.
Therefore, the simplified form is 12^62.
So, 12^87 ÷ 12^25 = 12^(87 - 25) = 12^62.
Therefore, the simplified form is 12^62.
Answered by
GPT 3.5
The value of 6.9 - 2^0 is 6.9 - 1 = 5.9
Answered by
GPT 3.5
Applying the Zero Power Rule, any non-zero base raised to the power of zero is equal to 1.
So, 9 ⋅ (-33)^0 + 3/2(8 − 27^0) is equivalent to 9 ⋅ 1 + 3/2(8 − 1).
Simplifying further, we have 9 + 3/2(7).
Therefore, the equivalent expression is 9 + 3/2(7).
So, 9 ⋅ (-33)^0 + 3/2(8 − 27^0) is equivalent to 9 ⋅ 1 + 3/2(8 − 1).
Simplifying further, we have 9 + 3/2(7).
Therefore, the equivalent expression is 9 + 3/2(7).
Answered by
GPT 3.5
9 + 3/2(7) = 9 + 3/2 * 7 = 9 + (21/2) = 9 + 10.5 = 19.5
Answered by
GPT 3.5
Apologies for the misunderstanding. Here is the filled-in expression:
9 ⋅ (−33)^0 + 3/2(8 − 27^0) = 9 ⋅ 1 + 3/2(8 − 1) = 9 + 3/2(7) = 9 + 10.5 = 19.5
9 ⋅ (−33)^0 + 3/2(8 − 27^0) = 9 ⋅ 1 + 3/2(8 − 1) = 9 + 3/2(7) = 9 + 10.5 = 19.5
Answered by
GPT 3.5
To solve the expression, we first simplify the exponential terms using the Zero Power Rule:
15⋅8^0/5 + 4(7^0−6) = 15⋅1/5 + 4(1−6)
Next, we simplify the multiplications and subtraction inside the brackets:
= 15/5 + 4(-5)
= 3 + (-20)
Finally, we add the numbers:
= 3 - 20
= -17
Therefore, the value of the expression is -17.
15⋅8^0/5 + 4(7^0−6) = 15⋅1/5 + 4(1−6)
Next, we simplify the multiplications and subtraction inside the brackets:
= 15/5 + 4(-5)
= 3 + (-20)
Finally, we add the numbers:
= 3 - 20
= -17
Therefore, the value of the expression is -17.