To solve this inequality, we first need to convert the expression involving the cube root of 5 to a fractional exponent:
1/3√5 = 5^(1/3)
Now, the inequality becomes:
25^(-2x/5) > 5^(1/3)
Next, we can rewrite 25 and 5 in terms of the same base (5):
5^2 = 25
(5^2)^(-2x/5) > 5^(1/3)
Using the properties of exponents, we can simplify further:
5^(-4x/5) > 5^(1/3)
Now, we can equate the exponents:
-4x/5 > 1/3
Multiplying both sides by 5 to get rid of the fraction:
-4x > 5/3
Dividing by -4 to isolate x:
x < -5/12
Therefore, the solution to the inequality is x < -5/12.
To solve this inequality, we first need to convert the expression involving the cube root of 5 to a fractional exponent:
1/3√5 = 5^(1/3)
Now, the inequality becomes:
25^(-2x/5) > 5^(1/3)
Next, we can rewrite 25 and 5 in terms of the same base (5):
5^2 = 25
Now, the inequality becomes:
(5^2)^(-2x/5) > 5^(1/3)
Using the properties of exponents, we can simplify further:
5^(-4x/5) > 5^(1/3)
Now, we can equate the exponents:
-4x/5 > 1/3
Multiplying both sides by 5 to get rid of the fraction:
-4x > 5/3
Dividing by -4 to isolate x:
x < -5/12
Therefore, the solution to the inequality is x < -5/12.