To simplify the expression 1/3^√(2) + 3^√(3) - 3^√(5), we can evaluate each term separately.
1/3^√(2) can be rewritten as 3^(-√2) since 3^-n = 1/3^n.
So, the expression becomes 3^(-√2) + 3^√(3) - 3^√(5).
Now, we need to evaluate each term using a calculator or a computer since the exponents are irrational numbers:
3^(-√2) ≈ 0.359,3^√(3) ≈ 5.495,3^√(5) ≈ 7.155.
Therefore, the simplified expression is approximately 0.359 + 5.495 - 7.155 = -1.301.
To simplify the expression 1/3^√(2) + 3^√(3) - 3^√(5), we can evaluate each term separately.
1/3^√(2) can be rewritten as 3^(-√2) since 3^-n = 1/3^n.
So, the expression becomes 3^(-√2) + 3^√(3) - 3^√(5).
Now, we need to evaluate each term using a calculator or a computer since the exponents are irrational numbers:
3^(-√2) ≈ 0.359,
3^√(3) ≈ 5.495,
3^√(5) ≈ 7.155.
Therefore, the simplified expression is approximately 0.359 + 5.495 - 7.155 = -1.301.