Pregunta
Solución de tutoría real
Respuesta verificada por el tutor
Responder
\( x = -\frac{2}{3} \)
Solución
To solve the equation:
\[
25 \cdot \left(125^{-x}\right) = 625
\]
**Step 1: Express All Terms with the Same Base**
Notice that 25, 125, and 625 are all powers of 5:
- \(25 = 5^2\)
- \(125 = 5^3\)
- \(625 = 5^4\)
Substitute these into the equation:
\[
5^2 \cdot \left(5^3\right)^{-x} = 5^4
\]
**Step 2: Simplify the Equation**
Use the property of exponents \((a^m)^n = a^{m \cdot n}\):
\[
5^2 \cdot 5^{-3x} = 5^4
\]
Combine the exponents on the left side using \(a^m \cdot a^n = a^{m+n}\):
\[
5^{2 - 3x} = 5^4
\]
**Step 3: Set Exponents Equal**
Since the bases are the same, set the exponents equal to each other:
\[
2 - 3x = 4
\]
**Step 4: Solve for \(x\)**
\[
-3x = 4 - 2
\]
\[
-3x = 2
\]
\[
x = \frac{2}{-3} = -\frac{2}{3}
\]
**Conclusion**
The solution to the equation is:
\[
x = -\frac{2}{3}
\]
Revisado y aprobado por el equipo de tutoría de UpStudy
Como
error msg
Explicar 
Simplifique esta solución Bonus Knowledge
To solve the equation \( 25\left(125^{-x}\right)=625 \), we can start by rewriting each term as a power of 5. We know that: - \( 25 = 5^2 \) - \( 125 = 5^3 \) - \( 625 = 5^4 \) Substituting these values into the equation gives us: \[ 5^2 \left( (5^3)^{-x} \right) = 5^4 \] This simplifies to: \[ 5^2 \left( 5^{-3x} \right) = 5^4 \] Combining the powers of 5 on the left side: \[ 5^{2 - 3x} = 5^4 \] Since the bases are the same, we can set the exponents equal to each other: \[ 2 - 3x = 4 \] Now, solving for \( x \): \[ -3x = 4 - 2 \] \[ -3x = 2 \] \[ x = -\frac{2}{3} \] Thus, the solution is \( x = -\frac{2}{3} \).
¡Prueba Premium ahora!
¡Prueba Premium y hazle a Thoth AI preguntas de matemáticas ilimitadas ahora!
Quizas mas tarde
Hazte Premium
