Advertisements
Advertisements
प्रश्न
The engine of a motor boat moving at 10 m/s is shut off. Given that the retardation at any subsequent time (after shutting off the engine) equal to the velocity at that time. Find the velocity after 2 seconds of switching off the engine
उत्तर
Let v be the velocity
Given the engine of a motorboat moving 10 m/s.
After that the engine is shut off then the acceleration is negative.
So it be `(- "dv")/"dt"`
i.e., `"dv"/"dt"` = – v
The equation can be written as taking integration on both sides, we get
`"dv"/"dt"` = – dt
`int "dv"/"v" = int - "dt"`
log v = – t + log c
log v – log c = – t
`log ("v"/"c")` = – t
`"v"/"c" = "e"^-"t"`
v = `"ce"^-"t"` ..........(1)
Initial condition:
Given that when t = 0, v = 10 m/sec i
Substituting in equation (1), we get !
10 = ce–0
10 = ce°
10 = c
∴ c = 10
(1) ⇒ v = 10e–t
When t = 2 find v
v = 10 e–2
v = `10/"e"^2`
The velocity after 2 seconds is `10/"e"^2`
i.e., v = `10/"e"^2`
APPEARS IN
संबंधित प्रश्न
The rate of increase in the number of bacteria in a certain bacteria culture is proportional to the number present. Given that the number triples in 5 hours, find how many bacteria will be present after 10 hours?
The equation of electromotive force for an electric circuit containing resistance and self-inductance is E = `"Ri" + "L" "di"/"dt"`, where E is the electromotive force is given to the circuit, R the resistance and L, the coefficient of induction. Find the current i at time t when E = 0
Suppose a person deposits ₹ 10,000 in a bank account at the rate of 5% per annum compounded continuously. How much money will be in his bank account 18 months later?
Assume that the rate at which radioactive nuclei decay is proportional to the number of such nuclei that are present in a given sample. In a certain sample, 10% of the original number of radioactive nuclei have undergone disintegration in a period of 100 years. What percentage of the original radioactive nuclei will remain after 1000 years?
Water at temperature 100°C cools in 10 minutes to 80°C at a room temperature of 25°C. Find the temperature of the water after 20 minutes
Water at temperature 100°C cools in 10 minutes to 80°C at a room temperature of 25°C. Find the time when the temperature is 40°C `[log_"e" 11/15 = - 0.3101; log_"e" 5 = 1.6094]`
At 10.00 A.M. a woman took a cup of hot instant coffee from her microwave oven and placed it on a nearby kitchen counter to cool. At this instant, the temperature of the coffee was 180°F and 10 minutes later it was 160°F. Assume that the constant temperature of the kitchen was 70°F. What was the temperature of the coffee at 10.15 AM? `|log 9/100 = - 0.6061|`
At 10.00 A.M. a woman took a cup of hot instant coffee from her microwave oven and placed it on a nearby kitchen counter to cool. At this instant, the temperature of the coffee was 180°F and 10 minutes later it was 160°F. Assume that the constant temperature of the kitchen was 70°F. The woman likes to drink coffee when its temperature is between130°F and 140°F. between what times should she have drunk the coffee? `|log 6/11 = - 0.2006|`
A pot of boiling water at 100°C is removed from a stove at time t = 0 and left to cool in the kitchen. After 5 minutes, the water temperature has decreased to 80° C and another 5 minutes later it has dropped to 65°C. Determine the temperature of the kitchen
Choose the correct alternative:
The integrating factor of the differential equation `("d"y)/("d"x) + y = (1 + y)/lambda` is
Choose the correct alternative:
The Integrating factor of the differential equation `("d"y)/("d"x) + "P"(x)y = "Q"(x)` is x, then p(x)
Choose the correct alternative:
The solution of the differential equation `("d"y)/("d"x) = 2xy` is
Choose the correct alternative:
The population P in any year t is such that the rate of increase in the population is proportional to the population. Then
Choose the correct alternative:
P is the amount of certain substance left in after time t. If the rate of evaporation of the substance is proportional to the amount remaining, then
