Six friends sat around a circular table. Ann (who is the the banker) sat opposite the consultant. Bob sat opposite Fred. Celia sat on the doctors right. Dave (who is not the consultant) sat opposite the accountant. Emily sat opposite the engineer and next to the financier. Fred sat on Ann's right.

Who sat where and what were their professions?

Idk

To solve this problem, we need to use logic and deductions to figure out the seating arrangement and professions of the six friends. Let's start by setting up the given information:

1. Ann (Banker) sat opposite the consultant.
2. Bob sat opposite Fred.
3. Celia sat on the doctor's right.
4. Dave (not the consultant) sat opposite the accountant.
5. Emily sat opposite the engineer and next to the financier.
6. Fred sat on Ann's right.

Let's assign variables to the six friends: A for Ann, B for Bob, C for Celia, D for Dave, E for Emily, and F for Fred. Also, let's use the following abbreviations for their professions: BNK for Banker, CON for Consultant, DOC for Doctor, ACC for Accountant, ENG for Engineer, and FIN for Financier.

Based on the given information, we can make the following deductions:

1. Ann sat opposite the consultant (CON). So, A must be opposite CON.
2. Bob sat opposite Fred (F). So, B must be opposite F.
3. Celia sat on the doctor's (DOC) right. So, C must be next to DOC.
4. Dave (not CON) sat opposite the accountant (ACC). So, D must be opposite ACC.
5. Emily sat opposite the engineer (ENG) and next to the financier (FIN). So, E must be opposite ENG and next to FIN.
6. Fred sat on Ann's right. So, F must be to the right of A.

Based on these deductions, we can start arranging the friends and their professions:

1. BNK --CON-- ?
2. ? --F-- ?
3. ? --DOC--C
4. ? --ACC--D
5. FIN-E --ENG-- ?
6. A --?--F

Now let's use the deductions to fill in the remaining gaps:

1. BNK --CON-- B
2. D --F-- ?
3. ? --DOC--C
4. ? --ACC--D
5. FIN-E --ENG-- A
6. A --?--F

From the given information, we know that Dave (D) is not the consultant (CON), so Dave's profession must be the accountant (ACC). This allows us to fill in some more gaps:

1. BNK --CON-- B
2. D --F-- ACC
3. ? --DOC--C
4. ? --ACC--D
5. FIN-E --ENG-- A
6. A --?--F

From the given information, Fred (F) is sitting on Ann's right (A), so Fred must be the consultant (CON). This helps us fill in more gaps:

1. BNK --CON-- B
2. D --F-- ACC
3. ? --DOC--C
4. ? --ACC--D
5. FIN-E --ENG-- A
6. A --?--F

Now, we know that Fred (F) is the consultant, so Ann (A) must be the banker (BNK). Also, since Dave (D) is the accountant (ACC) and Fred (F) cannot be the accountant, Bob (B) must be the engineer (ENG) sitting opposite Emily (E). Let's fill in more information:

1. BNK --CON-- B
2. D --F-- ACC
3. ? --DOC--C
4. ? --ACC--D
5. FIN-E --ENG-- A
6. A --?--F

From the given information, Celia (C) sits on the doctor's (DOC) right, so Celia must be the financier (FIN) and the doctor (DOC) must be sitting opposite Celia. Let's fill in this information:

1. BNK --CON-- B
2. D --F-- ACC
3. ? --DOC--C
4. ? --ACC--D
5. FIN-E --ENG-- A
6. A --?--F

Finally, we know that Emily (E) sat opposite the engineer (ENG), so the remaining profession must be the doctor (DOC) for C. Let's fill this in:

1. BNK --CON-- B
2. D --F-- ACC
3. DOC --DOC-- C
4. ? --ACC--D
5. FIN-E --ENG-- A
6. A --?--F

Now, there is only one profession left, which is the accountant (ACC) for D:

1. BNK --CON-- B
2. D --F-- ACC
3. DOC --DOC-- C
4. ACC --ACC--D
5. FIN-E --ENG-- A
6. A --?--F

By process of elimination, the remaining profession must be the financier (FIN) for E:

1. BNK --CON-- B
2. D --F-- ACC
3. DOC --DOC-- C
4. ACC --ACC--D
5. FIN-E --ENG-- A
6. A --FIN--F

Therefore, the seating arrangement and professions are as follows:

1. Ann (Banker) -- Consultant
2. Bob (Engineer) -- Financier
3. Celia (Doctor) -- Doctor
4. Dave (Accountant) -- Accountant
5. Emily (Financier) -- Engineer
6. Fred (Consultant) -- Banker

Note: Since the friends are sitting around a circular table, their positions are relative and can be rotated. The identified professions will remain the same regardless of the order in which the friends are seated.