Use the equation below to find \( d \), if \( r=44 \) and \( t=4 \). \( d=r t \) \( d=\square \)

To find \( d \), we can just plug in the values of \( r \) and \( t \) into the equation \( d = r t \). Here, \( r = 44 \) and \( t = 4 \). So, we calculate: \[ d = 44 \times 4 = 176 \] Thus, \( d = 176 \). Plugging values into equations is like fitting pieces into a puzzle; the right combination reveals the full picture! This quick calculation shows how mathematical equations can efficiently solve real-world problems, whether in budgeting or measuring distances. Understanding the relationships between variables is key in everything from finance to physics. Notice how changing either \( r \) or \( t \) would drastically impact \( d \)! For instance, doubling \( t \) gives you a whole new value for distance, opening doors to explore how adjustments affect outcomes in various scenarios.