Advertisements
Advertisements
प्रश्न
A train covers a distance of 300 km at a uniform speed. If the speed of the train is increased by 5 km/hour, it takes 2 hours less in the journey. Find the original speed of the train
उत्तर
Let constant speed of the train be x km/hr.
Thus, time taken to travel 300 km = `300/x` hours.
Now when the speed is increased then time is reduced by 2 hours.
Time taken to cover 300 km with speed x km/hr − Time taken to cover 300 km with increased speed = 2 hours
`300/x - 300/(x + 5) = 2`
`=> (300[x + 5 - x])/(x(x + 5)) = 2`
`=> (300xx 5)/(x(x+5)) = 2`
`=> 1500/(x^2 + 5x) = 2`
`=> 1500 = 2x^2 + 10x`
`=> x^2 + 5x - 750 = 0`
`=> x^2 + 30x - 25x - 750 = 0`
`=> (x + 30) (x - 25) = 0`
=> x = 25, -30
Since speed cannot be negative so the original speedof the trian = 25 km/hour
APPEARS IN
संबंधित प्रश्न
If x=3 is a solution of the equation `3x^2+(k-1)x+9=0` then k=?
(a) 11 (b)-11 (c)13 (d)-13
The roots of the equation `ax^2+bx+c=0` will be reciprocal each other if
(a)a=b (b)b=c (c)=a (d)= none of these
In the equation `ax^2+bx+c=0` it is given that `D=(b^2-4ac)>0`
equation are
(a) real and equal (b) real and unequal (c) imaginary (d) none of these
Find the solution of the quadratic equation `3sqrt3x^2+10x+sqrt3=0`
Find the value of k for which the quadratic equation `9x^2-3kx+k=0` has equal roots.
Solve for x: `3x^2-2sqrt6x+2=0`
Solve the following quadratic equation.
`1/(x + 5) = 1/x^2`
Alka spends 90 % of the amount sent to her and saves Rs. 120 per month. Find the amount sent to her per month.
Solve any four of the following.
Find the value of y in the equation x + y = 12, when x = 5
Present age of mother of Manish is 1 year more than 5 times the present age of Manish. Four years before, if the product of their ages was 22, then find the present age of Manish and his mother
