Class "T" generally means "Economy Fare"
I don't think your question is worded exactly right. It sounds like you are saying Airplane A departs at a speed of 500 m/hr. An hour later, Airplane B departs at a speed of 600 m/hr. When will Airplane B catch up to Airplane A. The question for this is D = R * T D- distance travelled R- rate or speed T- Time To solve this problem, you have to realize that when Airplane B reaches Airplane A, both aircraft will have traveled the same Distance D. Now let T be the Time for Airplane A to travel that unknown D. So first Equation: Airplane A : D = 500*T For Airplane B, it will have to travel Distance D in that 1 hour less than it took Airplane A to travel it. Airplane B: D = 600*(T-1) D is the same in both so the equation becomes 500*T = 600*(T-1) 500*T = 600*T -600 0 = 100 *T - 600 600 = 100*T T = 6 Hours. Airplane A travels distance D = 500 * T or 500 *(6) = 3,000 miles in 6 hours. Airplane B travels the same distance in 5 hours ---so it catches up to it. So even if this is not your problem, it should demonstrate how to form the problem into 2 Equations and eliminate some of the unknowns which allow you to solve it. ~Custermen~
depends on the airline.
airplane flew a total of 2440 miles at an average speed of 405 miles per hour. If t = the time the airplane took to fly 2440 miles, which of the following units could apply to t?
LCDR T class was created in 1879.
NER Class T was created in 1901.
flying on an airplane
Airplane, rotorcraft, glider, balloon.
here are the clues: the difference in time between the aircraft and the ground is 1 S. ie, T-t=1S T/t-1=1/t Substitute the time dilation expression for T/t in terms of velocity and solve it for 1/t. find t.
: airplane is equipped for instrument flight.
t={t} t is a retangle
South Australian Railways T class was created in 1903.
The pilot must be instrument rated, and the airplane must be IFR equipped.