Long before music was recorded digitally, people listened to music played on phonographs. An antiques dealer models the value of a vintage phonograph using the function V(t)=0.04t2–3t+395, where V(t) is the value in dollars and t is the number of years since 1925. The phonograph's value dropped as newer versions were introduced but then rose as it became an antique. In what year did the phonograph's value equal the value it had in the year 1925? What was that value?