Asked by d
Consider the product (2x−x3)(−3x4−7x2) . Which of the following is the correct expression when each term of the first polynomial is distributed onto the second polynomial?
2x(−3x4−7x2)−x3(−3x4−7x2)
2 x left parenthesis negative 3 x superscript 4 baseline minus 7 x squared right parenthesis minus x cubed left parenthesis negative 3 x superscript 4 baseline minus 7 x squared right parenthesis
2x(−3x4)−x3(−7x2)
2 x left parenthesis negative 3 x superscript 4 baseline right parenthesis minus x cubed left parenthesis negative 7 x squared right parenthesis
2x(−x3−3x4−7x2)
2 x left parenthesis negative 3 x cubed minus 3 x superscript 4 baseline minus 7 x squared right parenthesis
2x(−3x4−7x2)+x3(−3x4−7x2)
2x(−3x4−7x2)−x3(−3x4−7x2)
2 x left parenthesis negative 3 x superscript 4 baseline minus 7 x squared right parenthesis minus x cubed left parenthesis negative 3 x superscript 4 baseline minus 7 x squared right parenthesis
2x(−3x4)−x3(−7x2)
2 x left parenthesis negative 3 x superscript 4 baseline right parenthesis minus x cubed left parenthesis negative 7 x squared right parenthesis
2x(−x3−3x4−7x2)
2 x left parenthesis negative 3 x cubed minus 3 x superscript 4 baseline minus 7 x squared right parenthesis
2x(−3x4−7x2)+x3(−3x4−7x2)
Answers
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Answered by
GPT-4o mini
To distribute the first polynomial \( (2x - x^3) \) onto the second polynomial \( (-3x^4 - 7x^2) \), we need to take each term from the first polynomial and multiply it by every term from the second polynomial.
This can be done as follows:
1. Distributing \( 2x \) over \( (-3x^4 - 7x^2) \):
\[
2x \cdot (-3x^4) + 2x \cdot (-7x^2) = -6x^5 - 14x^3
\]
2. Distributing \( -x^3 \) over \( (-3x^4 - 7x^2) \):
\[
-x^3 \cdot (-3x^4) + -x^3 \cdot (-7x^2) = 3x^7 + 7x^5
\]
Combining these gives:
\[
-6x^5 - 14x^3 + 3x^7 + 7x^5 = 3x^7 + (-6x^5 + 7x^5) - 14x^3 = 3x^7 + x^5 - 14x^3
\]
Now, to determine which of the provided expressions matches this distribution:
The closest expression is:
\[
2x(-3x^4 - 7x^2) + x^3(-3x^4 - 7x^2)
\]
This represents correctly distributing each term of the first polynomial onto the second.
So the correct choice is:
\[
2x(-3x^4 - 7x^2) + x^3(-3x^4 - 7x^2)
\]
This can be done as follows:
1. Distributing \( 2x \) over \( (-3x^4 - 7x^2) \):
\[
2x \cdot (-3x^4) + 2x \cdot (-7x^2) = -6x^5 - 14x^3
\]
2. Distributing \( -x^3 \) over \( (-3x^4 - 7x^2) \):
\[
-x^3 \cdot (-3x^4) + -x^3 \cdot (-7x^2) = 3x^7 + 7x^5
\]
Combining these gives:
\[
-6x^5 - 14x^3 + 3x^7 + 7x^5 = 3x^7 + (-6x^5 + 7x^5) - 14x^3 = 3x^7 + x^5 - 14x^3
\]
Now, to determine which of the provided expressions matches this distribution:
The closest expression is:
\[
2x(-3x^4 - 7x^2) + x^3(-3x^4 - 7x^2)
\]
This represents correctly distributing each term of the first polynomial onto the second.
So the correct choice is:
\[
2x(-3x^4 - 7x^2) + x^3(-3x^4 - 7x^2)
\]
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