Let's analyze the problem step-by-step.

Problem Restatement

• A completes 8?\frac{8}{?}?8​ of a work in 20 days. (Assuming the problem means "A completes 810\frac{8}{10}108​ or 45\frac{4}{5}54​ of the work in 20 days" or "A completes 8 units of work in 20 days" - but since the problem is unclear, let's assume A completes 810=45\frac{8}{10}=\frac{4}{5}108​=54​ of the work in 20 days.)
• Then B joins A, and together they finish the remaining work in 3 days.
• We need to find how long B alone will take to complete the entire work.

Step 1: Clarify the problem

Since the problem states "a completes 8 of a work in 20 days," it likely means:

• A completes 810\frac{8}{10}108​ (or 80%) of the work in 20 days.
• Remaining work = 1−810=210=151-\frac{8}{10}=\frac{2}{10}=\frac{1}{5}1−108​=102​=51​.

Step 2: Calculate A's work rate

• A completes 810\frac{8}{10}108​ of the work in 20 days.
• So, A's work rate = 8/1020=810×20=8200=250=125\frac{8/10}{20}=\frac{8}{10\times 20}=\frac{8}{200}=\frac{2}{50}=\frac{1}{25}208/10​=10×208​=2008​=502​=251​ work per day.

Step 3: Calculate combined work rate of A and B

• Remaining work = 15\frac{1}{5}51​.
• A and B together finish this in 3 days.
• So, combined work rate of A and B = 1/53=115\frac{1/5}{3}=\frac{1}{15}31/5​=151​ work per day.

Step 4: Calculate B's work rate

• Combined rate = A's rate + B's rate
• 115=125+B’s rate\frac{1}{15}=\frac{1}{25}+\text{B's rate}151​=251​+B’s rate
• B's rate = 115−125=5−375=275\frac{1}{15}-\frac{1}{25}=\frac{5-3}{75}=\frac{2}{75}151​−251​=755−3​=752​ work per day.

Step 5: Calculate how long B alone takes to finish the work

• B's rate = 275\frac{2}{75}752​ work per day
• Time taken by B alone = 1B’s rate=12/75=752=37.5\frac{1}{\text{B's rate}}=\frac{1}{2/75}=\frac{75}{2}=37.5B’s rate1​=2/751​=275​=37.5 days.

Final Answer:

B alone will take 37.5 days to complete the entire work. If you want me to clarify any step or if the problem meant something else, please let me know!