.
Their combined rate of work is = of the job per hour.
// Notice that = hours = 2.5 hours.
Thomas' individual rate of work is of the job per hour.
Hence, Joanna's rate of work is = = of the job per hour.
It means that Joamnna will complete the job in = hours = 6 hours and 40 minutes working alone.
Solved.
It is a typical joint work problem.
There is a wide variety of similar solved joint-work problems with detailed explanations in this site. See the lessons
- Using Fractions to solve word problems on joint work
- Solving more complicated word problems on joint work
- Selected joint-work word problems from the archive
Read them and get be trained in solving joint-work problems.
Also, you have this free of charge online textbook in ALGEBRA-I in this site
- ALGEBRA-I - YOUR ONLINE TEXTBOOK.
The referred lessons are the part of this textbook under the topic
"Rate of work and joint work problems" of the section "Word problems".
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Some people use equation/equations to solve such problems.
But actually, these problems can be solved in much simpler way, without using equations, as I did in my solution.
Not only it is simpler - it helps students to understand better the meaning of things behind the solution.
So, manipulating with the fractions only is ALL what you need to get the solution in this case.
But for it, you need to understand well what you are doing.
My principle is
"The solution must be as simple as the problem requires.
It should not be more complicated, unless special circumstances force you to do it in other way."