Advertisements
Advertisements
Question
A boat goes 30 km upstream and 44 km downstream in 10 hours. In 13 hours, it can go 40 km upstream and 55 km downstream. Determine the speed of the stream and that of the boat in still water.
Solution
Let the speed of the boat in still water be x km/hr and the speed of the stream be y km/hr
Speed upstream = ( x - y ) km/hr
Speed downstream = (x + y) km/hr
Now,
Time is taken to cover 30 km upstream = `(30)/("x"-"y") "hrs"`
Time taken to cover 44 km down stream = `(44)/("x"+"y")"hrs"`
But total time of journey is 10 hours
`(30)/("x"-"y") + (44)/("x"+"y") = 10` ...(i)
Time taken to cover 40 km upstream= `(40)/("x"-"y")"hrs"`
Time taken to cover 55 km down stream = `(55)/("x"+"y")"hrs"`
In this case total time of journey is given to be 13 hours
Therefore,`(40)/("x"-"y")+(55)/("x"+"y") = 13` ...(ii)
Putting `(1)/("x"-"y") = "u" and (1)/("x"+"y") = "v"` in equation (i) and (ii) we get
30u + 44v - 10 = 0 ...(iii)
40u + 55v - 13 = 0 ...(iv)
Solving these equations by cross multiplication we get
`("u")/(44xx-13-15 xx-10) = ("-v")/(30 xx-13-14xx -10) = (1)/(30 xx55-40xx44)`
`("u")/(-572+550) = ("-v")/(-390+400) = (1)/(1650-1760)`
`("u")/(-22) = ("-v")/(10) = (1)/(-110)`
`"u" = (-22)/(-110)`
`"v" = (-110)/(-110)`
`"u" = (2)/(10) and "v" =(1)/(11)`
Now,
`"u" = (2)/(10)`
`(1)/("x"-"y") = (2)/(10)`
1 x 10 = 2 (x - y)
10 = 2x - 2y ÷ 2
`"u"= (2)/(10)`
`(1)/("x"-"y") = (2)/(10)`
1 x 10 = 2 (x - y)
10 = 2x - 2y
5 = x - y ...(v)
`"v" =(1)/(11)`
`(1)/("x"+"y") = (1)/(11)`
1 x 11 = 1 (x + y)
By solving equation (v) and (vi) we get,
x - y = 5
`("x"+"y" = 11)/(2"x" =16)`
`"x" = (16)/(2)`
x = 8
Substituting x = 8 in equation (vi) we get,
x + y = 11
8 + y = 11
y = 11 - 8
y = 3
Hence, speed of the boat in still water is 8km/hr
Speed of the stream is 3km /hr
RELATED QUESTIONS
The sum of the roots of the equation` x^2-6x+2=0`
(a) 2 (b)-2 (c)6 (d)-6
If α and β are the roots of the equation `3x^2+8x+2=0` then (1/α+1/β)=?
(a)` -3/8` (b) `2/3` `(c) -4 (d)4`
The roots of the equation 2x^2-6x+7=0 are
(a) real, unequal and rational (b) real, unequal and irrational (c) real and equal (d) imaginary
For what value of k, the equation `kx^2-6x2=0` has real roots?
(a) `k≤-9/2` (b)`k≥-9/2`
(c)` k≤-2` (d) None of these
Vivek is older than Kishor by 5 years. The sum of the reciprocals of their ages is \[\frac{1}{6}\] Find their present ages.
Choose the correct answer for the following question.
Out of the following equations which one is not a quadratic equation?
Choose the correct answer for the following question.
For \[\sqrt{2} x^2 - 5x + \sqrt{2} = 0\] find the value of the discriminant.
Find the value of m so that the quadratic equation mx (x − 7) + 49 = 0 has two equal roots.
Obtain a quadratic equation whose roots are –3 and –7.
Write the degree of Polynomial 5x2 + 2x + 3x4 + 4.
