c) For polynomials \( p, q \), and \( r \), where \( (q \neq 0 \) and \( r \neq 0), \frac{p r}{q r} \) simplifies to
Solución de inteligencia artificial de Upstudy
Responder
Solución

¡Inicia sesión para desbloquear respuestas gratis!
Una plataforma de aprendizaje en la que confían millones de estudiantes y profesores reales.

Respondido por UpStudy AI y revisado por un tutor profesional
Bonus Knowledge
When you have the expression \(\frac{p r}{q r}\), you can simplify it by recognizing that the \(r\) in the numerator and the denominator can cancel out, provided \(r \neq 0\). This leaves you with: \[ \frac{p r}{q r} = \frac{p}{q} \] So as long as \(q\) is also not zero ( \(q \neq 0\) ), the expression simplifies beautifully to \(\frac{p}{q}\). Simple, right? But remember, always double-check that neither \(q\) nor \(r\) is zero before going through the swish of cancellation, or you might find yourself in a mathematical mess!
