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Subtract the following:

A. [tex]\( 8x^7 \sqrt{26} \)[/tex]

B. [tex]\( 9x^7 \sqrt{10} \)[/tex]

C. [tex]\( 103x^7 \sqrt{13x} \)[/tex]

D. [tex]\( 3x^7 \sqrt{13} \)[/tex]

Answer :

To solve the problem of subtracting expressions B, C, and D from expression A, we follow these steps:

1. List the given expressions:
- Expression A: [tex]\( 8 x^7 \sqrt{26} \)[/tex]
- Expression B: [tex]\( 9 x^7 \sqrt{10} \)[/tex]
- Expression C: [tex]\( 103 x^7 \sqrt{13 x} \)[/tex]
- Expression D: [tex]\( 3 x^7 \sqrt{13} \)[/tex]

2. Set up the subtraction:
[tex]\[
8 x^7 \sqrt{26} - \left(9 x^7 \sqrt{10} + 103 x^7 \sqrt{13 x} + 3 x^7 \sqrt{13}\right)
\][/tex]

3. Distribute the negative sign and combine like terms:
[tex]\[
8 x^7 \sqrt{26} - 9 x^7 \sqrt{10} - 103 x^7 \sqrt{13 x} - 3 x^7 \sqrt{13}
\][/tex]

4. Write the result in a simplified form:
Each term is combined accordingly, keeping the respective coefficients, exponents, and radicals unchanged.

Thus, the final result of the subtraction is:
[tex]\[
-103 x^7 \sqrt{13 x} - 9 x^7 \sqrt{10} - 3 x^7 \sqrt{13} + 8 x^7 \sqrt{26}
\][/tex]

Thanks for taking the time to read Subtract the following A tex 8x 7 sqrt 26 tex B tex 9x 7 sqrt 10 tex C tex 103x 7 sqrt 13x tex D. We hope the insights shared have been valuable and enhanced your understanding of the topic. Don�t hesitate to browse our website for more informative and engaging content!

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