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25 votes
25 votes
Solve the inequality for x
3^(6x+18)<27^(3x)

User Swayziak
by
2.6k points

2 Answers

19 votes
19 votes

Answer:


x>6

Explanation:

When given the following equation;


3^(^6^x^+^1^8)<27^(^3^x^)

One is asked to solve for (
x). The inequality has exponents, hence, it appears daunting at first, however, the easiest way to deal with exponents is to bring them to the same base. This allows for one to have the ability to treat the exponents like an ordinary number. Since (
27=3^3) one can rewrite (
27^(^3^x^)) as (
3^3^*^(^3^x^)). This is possible because raising a number to an exponent when it already has an exponent is the same as multiplying the two exponents. Rewrite the inequality in this format;


3^(^6^x^+^1^8)<3^3^(^3^x^)

Simplify,


3^(^6^x^+^1^8^)<3^(^9^x^)

Since the bases are the same they no longer have any relevance, so one can ignore the bases and only work with the exponents,


6x+18<9x

Now solve this inequality like a normal inequality. Use inverse operations;


6x+18<9x


18<3x


6<x

28 votes
28 votes

Answer:


\displaystyle x > 6

General Formulas and Concepts:

Pre-Algebra

Order of Operations: BPEMDAS

  1. Brackets
  2. Parenthesis
  3. Exponents
  4. Multiplication
  5. Division
  6. Addition
  7. Subtraction
  • Left to Right

Equality Properties

  • Multiplication Property of Equality
  • Division Property of Equality
  • Addition Property of Equality
  • Subtraction Property of Equality

Algebra I

  • Terms/Coefficients
  • Factoring

Algebra II

  • Exponential Rule [Powering]:
    \displaystyle (b^m)^n = b^(m \cdot n)
  • Solving exponential equations

Explanation:

Step 1: Define

Identify


\displaystyle 3^(6x + 18) < 27^(3x)

Step 2: Solve for x

  1. Rewrite:
    \displaystyle 3^(6x + 18) < 3^(3(3x))
  2. Set:
    \displaystyle 6x + 18 < 3(3x)
  3. Factor:
    \displaystyle 3(2x + 6) < 3(3x)
  4. [Division Property of Equality] Divide 3 on both sides:
    \displaystyle 2x + 6 < 3x
  5. [Subtraction Property of Equality] Subtract 3x on both sides:
    \displaystyle -x + 6 < 0
  6. [Subtraction Property of Equality] Subtract 6 on both sides:
    \displaystyle -x < -6
  7. [Division Property of Equality] Divide -1 on both sides:
    \displaystyle x > 6
User Christian Schmitt
by
3.4k points