Ask Question
16 March, 14:16

What value of n makes the equation true?

(2x^9 y^n) (4x^2 y^10) = 8x^11 y^10

+1
Answers (2)
  1. 16 March, 17:35
    0
    given that:

    (2x^9y^n) (4x^2y^10) = 8x^11y^20

    the value of n that will make the inequality true will be fond as follows;

    (2x^9y^n) (4x^2y^10) = 8x^11y^ (n+10)

    thus;

    8x^11y^ (n+10) = 8x^11y^20

    dividing through by 8x^11 we get;

    y^ (n+10) = y^20

    introducing the natural logs we get;

    (n+10) lny=20lny

    lny will cancel out and we shall remain with;

    n+10=20

    thus

    n=20-10

    n=10

    the answer is n=10
  2. 16 March, 18:14
    0
    C) 10

    Explanation:

    Ezz Ezz
Know the Answer?
Not Sure About the Answer?
Find an answer to your question ✅ “What value of n makes the equation true? (2x^9 y^n) (4x^2 y^10) = 8x^11 y^10 ...” in 📘 Biology if you're in doubt about the correctness of the answers or there's no answer, then try to use the smart search and find answers to the similar questions.
Search for Other Answers