Answe:a) Altitude of Plane A (in meters) = 352+24tAltitude of Plane B (in meters) = 22tb) 352 + 24t = 22tStep-by-step explanation:a) We have that Plane A has an altitude of 352m, and is gaining altitude at 14m/s.Plane B has an altitude of 0m and is gaining altitude at 22 m/s.To know the altitudes of Planes A and B we have to add the altitude they have plus the product of the altitude they are gaining and the time in seconds:An expression for this would be:Altitude of Plane = x + ytwhere:x is the altitude that they start with, in metersy is the gaining altitude in m/st is the time in secondsWe substitute the values for plane AAltitude of plane A = 352m + 14m/s *tWe substitute the values for plane BAltitude of Plane B = 0m + 22m/s*tAltitude of Plane B = 22m/s*tb) An equation to show that the two planes are at the same altitude we have to equalize the two expressions of the planes:Altitude of Plane A = Altitude of Plane BWe can change this to:352m + 14m/s*t = 22m/s*tThis is the expression.(To know how much time will it take them to have the same altitude we just have to solve for t:352 + 14t = 22t352 = 22t - 14t352 = 8t352/8 = tt = 44 secondsAnd the planes will have an altitude of:Altitude of plane A = 352 + 14*44Altitude of Plane A = 968 mAltitude of Plane B = 22*44Altitude of Plane B = 968 m)...

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