SOLUTION: If Sally can paint a house in a 4 hours, and John can paint the same house in 6 hours, How long will it take for both of them to paint the house together?
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Question 249668: If Sally can paint a house in a 4 hours, and John can paint the same house in 6 hours, How long will it take for both of them to paint the house together?
Found 3 solutions by richwmiller, Alan3354, Edwin McCravy:
Answer by richwmiller(17219) (Show Source): You can put this solution on YOUR website!
What is this a doll house?
You can't paint a house in 4 hours. There is preparation, sanding, masking, trim.
in one hour Sally paints 1/4 of the house
in one hour John paints 1/6 of the house
add up john's time and sally time together is equal to one
Answer by Alan3354(69443) (Show Source): You can put this solution on YOUR website!
If Sally can paint a house in a 4 hours, and John can paint the same house in 6 hours, How long will it take for both of them to paint the house together?
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Use product/sum
= 4*6/(4+6) = 24/10
= 2.4 hours.
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The long way:
S does 1/4 of the house per hour.
J does 1/6 per hour.
Together, they do 1/4 + 1/6 per hour = 5/12
5/12 house per hour --> 12/5 hours per house
= 2.4 hours.
Answer by Edwin McCravy(20054) (Show Source): You can put this solution on YOUR website!
if one painter can paint a house in 6 hours, and another painter paints a house in 9 hours. How long will it take them to paint the house working together
If Sally can paint a house in a 4 hours, and John can paint the same house in 6 hours, How long will it take for both of them to paint the house together?
Let x = the number of hours working together (what is asked for)
Make this chart:
No. of Houses Rate Time
Sally
John
------------------------------------------------------
both together
Fill in x for the time for both together to paint 1 house:
No. of Houses Rate Time
Sally
John
------------------------------------------------------
both together 1 x
>>...Sally can paint a house in 4 hours...<<
So fill in 1 house and 4 hours for the Sally,
her no. of houses and her number of hours, respectively.
No. of Houses Rate Time
Sally 1 4
John
------------------------------------------------------
both together 1 x
>>...John can paint the same house in 6 hours...<<
So fill in 1 house and 9 hours for John,
his no. of houses and his number of hours, respectively.
No. of Houses Rate Time
Sally 1 4
John 1 6
------------------------------------------------------
both together 1 x
Now fill in all three rates using the formula
No. of Houses Rate Time
Sally 1 1/4 4
John 1 1/6 6
------------------------------------------------------
both together 1 1/x x
Now form the equation by using the fact that
Sally's rate + John's rate = their rate together
Can you get a LCD of 12x and solve that equation for x?
If not post again asking how to.
Answer: hours or hours or hours or
hours and minutes.
Edwin
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