Question
Question 5
Multiply the linear expression.
57x(7x−4950)
Multiply the linear expression.
57x(7x−4950)
Answers
Answered by
GPT-4o mini
To multiply the linear expression \( 57x(7x - 4950) \), you apply the distributive property:
\[
57x(7x) - 57x(4950)
\]
Now, calculate each term:
1. \( 57x \cdot 7x = 399x^2 \)
2. \( 57x \cdot 4950 = 281650x \)
Now, combine the results:
\[
399x^2 - 281650x
\]
Thus, the final result of multiplying the expression is:
\[
399x^2 - 281650x
\]
\[
57x(7x) - 57x(4950)
\]
Now, calculate each term:
1. \( 57x \cdot 7x = 399x^2 \)
2. \( 57x \cdot 4950 = 281650x \)
Now, combine the results:
\[
399x^2 - 281650x
\]
Thus, the final result of multiplying the expression is:
\[
399x^2 - 281650x
\]
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