Coded Syllogism | Worksheet 3/10 - Beginner skill builder ⚡

Question 1

Code Key: @ = All, # = Some, $ = No, & = are M = roses, N = flowers, O = plants Coded Statements: @ M & N # N & O Decoded Conclusions: I. Some roses are plants. II. All plants being roses is a possibility.

Decoding Process:

Step 1: Decode the statements
@ M & N → All roses are flowers
# N & O → Some flowers are plants

Step 2: Apply syllogism rules
All A are B (A) + Some B are C (I) = A + I = No definite conclusion

Step 3: Check conclusions
✗ Conclusion I: "Some roses are plants" - NOT DEFINITE
✓ Conclusion II: "All plants being roses is a possibility" - No negatives, possibility exists

Coding Pattern:
@ (All), # (Some), $ (No) represent quantifiers
& represents "are"
Letters represent categories

Answer: Only conclusion II follows

Question 2

Code Key: @ = All, # = Some, $ = No, & = are P = cats, Q = dogs, R = pets Coded Statements: @ P & Q # Q & R Decoded Conclusions: I. Some cats are pets. II. All pets being cats is a possibility.

Decoding Process:

Step 1: Decode the statements
@ P & Q → All cats are dogs
# Q & R → Some dogs are pets

Step 2: Apply syllogism rules
All A are B (A) + Some B are C (I) = A + I = No definite conclusion

Step 3: Check conclusions
✗ Conclusion I: "Some cats are pets" - NOT DEFINITE
✓ Conclusion II: "All pets being cats is a possibility" - No negatives, possibility exists

Coding Pattern:
@ (All), # (Some), $ (No) represent quantifiers
& represents "are"
Letters represent categories

Answer: Only conclusion II follows

Question 3

Code Key: @ = All, # = Some, $ = No, & = are X = books, Y = novels, Z = publications Coded Statements: @ X & Y # Y & Z Decoded Conclusions: I. Some books are publications. II. All publications being books is a possibility.

Decoding Process:

Step 1: Decode the statements
@ X & Y → All books are novels
# Y & Z → Some novels are publications

Step 2: Apply syllogism rules
All A are B (A) + Some B are C (I) = A + I = No definite conclusion

Step 3: Check conclusions
✗ Conclusion I: "Some books are publications" - NOT DEFINITE
✓ Conclusion II: "All publications being books is a possibility" - No negatives, possibility exists

Coding Pattern:
@ (All), # (Some), $ (No) represent quantifiers
& represents "are"
Letters represent categories

Answer: Only conclusion II follows

Question 4

Code Key: @ = All, # = Some, $ = No, & = are P = cats, Q = dogs, R = pets Coded Statements: @ P & Q # Q & R Decoded Conclusions: I. Some cats are pets. II. All pets being cats is a possibility.

Decoding Process:

Step 1: Decode the statements
@ P & Q → All cats are dogs
# Q & R → Some dogs are pets

Step 2: Apply syllogism rules
All A are B (A) + Some B are C (I) = A + I = No definite conclusion

Step 3: Check conclusions
✗ Conclusion I: "Some cats are pets" - NOT DEFINITE
✓ Conclusion II: "All pets being cats is a possibility" - No negatives, possibility exists

Coding Pattern:
@ (All), # (Some), $ (No) represent quantifiers
& represents "are"
Letters represent categories

Answer: Only conclusion II follows

Question 5

Code Key: @ = All, # = Some, $ = No, & = are A = doctors, B = professionals, C = graduates Coded Statements: @ A & B # B & C Decoded Conclusions: I. Some doctors are graduates. II. All graduates being doctors is a possibility.

Decoding Process:

Step 1: Decode the statements
@ A & B → All doctors are professionals
# B & C → Some professionals are graduates

Step 2: Apply syllogism rules
All A are B (A) + Some B are C (I) = A + I = No definite conclusion

Step 3: Check conclusions
✗ Conclusion I: "Some doctors are graduates" - NOT DEFINITE
✓ Conclusion II: "All graduates being doctors is a possibility" - No negatives, possibility exists

Coding Pattern:
@ (All), # (Some), $ (No) represent quantifiers
& represents "are"
Letters represent categories

Answer: Only conclusion II follows

Question 6

Code Key: @ = All, # = Some, $ = No, & = are A = doctors, B = professionals, C = graduates Coded Statements: @ A & B # B & C Decoded Conclusions: I. Some doctors are graduates. II. All graduates being doctors is a possibility.

Decoding Process:

Step 1: Decode the statements
@ A & B → All doctors are professionals
# B & C → Some professionals are graduates

Step 2: Apply syllogism rules
All A are B (A) + Some B are C (I) = A + I = No definite conclusion

Step 3: Check conclusions
✗ Conclusion I: "Some doctors are graduates" - NOT DEFINITE
✓ Conclusion II: "All graduates being doctors is a possibility" - No negatives, possibility exists

Coding Pattern:
@ (All), # (Some), $ (No) represent quantifiers
& represents "are"
Letters represent categories

Answer: Only conclusion II follows

Question 7

Code Key: @ = All, # = Some, $ = No, & = are X = books, Y = novels, Z = publications Coded Statements: @ X & Y # Y & Z Decoded Conclusions: I. Some books are publications. II. All publications being books is a possibility.

Decoding Process:

Step 1: Decode the statements
@ X & Y → All books are novels
# Y & Z → Some novels are publications

Step 2: Apply syllogism rules
All A are B (A) + Some B are C (I) = A + I = No definite conclusion

Step 3: Check conclusions
✗ Conclusion I: "Some books are publications" - NOT DEFINITE
✓ Conclusion II: "All publications being books is a possibility" - No negatives, possibility exists

Coding Pattern:
@ (All), # (Some), $ (No) represent quantifiers
& represents "are"
Letters represent categories

Answer: Only conclusion II follows

Question 8

Code Key: @ = All, # = Some, $ = No, & = are X = books, Y = novels, Z = publications Coded Statements: @ X & Y # Y & Z Decoded Conclusions: I. Some books are publications. II. All publications being books is a possibility.

Decoding Process:

Step 1: Decode the statements
@ X & Y → All books are novels
# Y & Z → Some novels are publications

Step 2: Apply syllogism rules
All A are B (A) + Some B are C (I) = A + I = No definite conclusion

Step 3: Check conclusions
✗ Conclusion I: "Some books are publications" - NOT DEFINITE
✓ Conclusion II: "All publications being books is a possibility" - No negatives, possibility exists

Coding Pattern:
@ (All), # (Some), $ (No) represent quantifiers
& represents "are"
Letters represent categories

Answer: Only conclusion II follows

Question 9

Code Key: @ = All, # = Some, $ = No, & = are M = roses, N = flowers, O = plants Coded Statements: @ M & N # N & O Decoded Conclusions: I. Some roses are plants. II. All plants being roses is a possibility.

Decoding Process:

Step 1: Decode the statements
@ M & N → All roses are flowers
# N & O → Some flowers are plants

Step 2: Apply syllogism rules
All A are B (A) + Some B are C (I) = A + I = No definite conclusion

Step 3: Check conclusions
✗ Conclusion I: "Some roses are plants" - NOT DEFINITE
✓ Conclusion II: "All plants being roses is a possibility" - No negatives, possibility exists

Coding Pattern:
@ (All), # (Some), $ (No) represent quantifiers
& represents "are"
Letters represent categories

Answer: Only conclusion II follows

Question 10

Code Key: @ = All, # = Some, $ = No, & = are X = books, Y = novels, Z = publications Coded Statements: @ X & Y # Y & Z Decoded Conclusions: I. Some books are publications. II. All publications being books is a possibility.

Decoding Process:

Step 1: Decode the statements
@ X & Y → All books are novels
# Y & Z → Some novels are publications

Step 2: Apply syllogism rules
All A are B (A) + Some B are C (I) = A + I = No definite conclusion

Step 3: Check conclusions
✗ Conclusion I: "Some books are publications" - NOT DEFINITE
✓ Conclusion II: "All publications being books is a possibility" - No negatives, possibility exists

Coding Pattern:
@ (All), # (Some), $ (No) represent quantifiers
& represents "are"
Letters represent categories

Answer: Only conclusion II follows

Question 11

Code Key: @ = All, # = Some, $ = No, & = are A = doctors, B = professionals, C = graduates Coded Statements: @ A & B # B & C Decoded Conclusions: I. Some doctors are graduates. II. All graduates being doctors is a possibility.

Decoding Process:

Step 1: Decode the statements
@ A & B → All doctors are professionals
# B & C → Some professionals are graduates

Step 2: Apply syllogism rules
All A are B (A) + Some B are C (I) = A + I = No definite conclusion

Step 3: Check conclusions
✗ Conclusion I: "Some doctors are graduates" - NOT DEFINITE
✓ Conclusion II: "All graduates being doctors is a possibility" - No negatives, possibility exists

Coding Pattern:
@ (All), # (Some), $ (No) represent quantifiers
& represents "are"
Letters represent categories

Answer: Only conclusion II follows

Question 12

Code Key: @ = All, # = Some, $ = No, & = are A = doctors, B = professionals, C = graduates Coded Statements: @ A & B # B & C Decoded Conclusions: I. Some doctors are graduates. II. All graduates being doctors is a possibility.

Decoding Process:

Step 1: Decode the statements
@ A & B → All doctors are professionals
# B & C → Some professionals are graduates

Step 2: Apply syllogism rules
All A are B (A) + Some B are C (I) = A + I = No definite conclusion

Step 3: Check conclusions
✗ Conclusion I: "Some doctors are graduates" - NOT DEFINITE
✓ Conclusion II: "All graduates being doctors is a possibility" - No negatives, possibility exists

Coding Pattern:
@ (All), # (Some), $ (No) represent quantifiers
& represents "are"
Letters represent categories

Answer: Only conclusion II follows

Question 13

Code Key: @ = All, # = Some, $ = No, & = are M = roses, N = flowers, O = plants Coded Statements: @ M & N # N & O Decoded Conclusions: I. Some roses are plants. II. All plants being roses is a possibility.

Decoding Process:

Step 1: Decode the statements
@ M & N → All roses are flowers
# N & O → Some flowers are plants

Step 2: Apply syllogism rules
All A are B (A) + Some B are C (I) = A + I = No definite conclusion

Step 3: Check conclusions
✗ Conclusion I: "Some roses are plants" - NOT DEFINITE
✓ Conclusion II: "All plants being roses is a possibility" - No negatives, possibility exists

Coding Pattern:
@ (All), # (Some), $ (No) represent quantifiers
& represents "are"
Letters represent categories

Answer: Only conclusion II follows

Question 14

Code Key: @ = All, # = Some, $ = No, & = are X = books, Y = novels, Z = publications Coded Statements: @ X & Y # Y & Z Decoded Conclusions: I. Some books are publications. II. All publications being books is a possibility.

Decoding Process:

Step 1: Decode the statements
@ X & Y → All books are novels
# Y & Z → Some novels are publications

Step 2: Apply syllogism rules
All A are B (A) + Some B are C (I) = A + I = No definite conclusion

Step 3: Check conclusions
✗ Conclusion I: "Some books are publications" - NOT DEFINITE
✓ Conclusion II: "All publications being books is a possibility" - No negatives, possibility exists

Coding Pattern:
@ (All), # (Some), $ (No) represent quantifiers
& represents "are"
Letters represent categories

Answer: Only conclusion II follows

Question 15

Code Key: @ = All, # = Some, $ = No, & = are M = roses, N = flowers, O = plants Coded Statements: @ M & N # N & O Decoded Conclusions: I. Some roses are plants. II. All plants being roses is a possibility.

Decoding Process:

Step 1: Decode the statements
@ M & N → All roses are flowers
# N & O → Some flowers are plants

Step 2: Apply syllogism rules
All A are B (A) + Some B are C (I) = A + I = No definite conclusion

Step 3: Check conclusions
✗ Conclusion I: "Some roses are plants" - NOT DEFINITE
✓ Conclusion II: "All plants being roses is a possibility" - No negatives, possibility exists

Coding Pattern:
@ (All), # (Some), $ (No) represent quantifiers
& represents "are"
Letters represent categories

Answer: Only conclusion II follows

Question 16

Code Key: @ = All, # = Some, $ = No, & = are A = doctors, B = professionals, C = graduates Coded Statements: @ A & B # B & C Decoded Conclusions: I. Some doctors are graduates. II. All graduates being doctors is a possibility.

Decoding Process:

Step 1: Decode the statements
@ A & B → All doctors are professionals
# B & C → Some professionals are graduates

Step 2: Apply syllogism rules
All A are B (A) + Some B are C (I) = A + I = No definite conclusion

Step 3: Check conclusions
✗ Conclusion I: "Some doctors are graduates" - NOT DEFINITE
✓ Conclusion II: "All graduates being doctors is a possibility" - No negatives, possibility exists

Coding Pattern:
@ (All), # (Some), $ (No) represent quantifiers
& represents "are"
Letters represent categories

Answer: Only conclusion II follows

Question 17

Code Key: @ = All, # = Some, $ = No, & = are P = cats, Q = dogs, R = pets Coded Statements: @ P & Q # Q & R Decoded Conclusions: I. Some cats are pets. II. All pets being cats is a possibility.

Decoding Process:

Step 1: Decode the statements
@ P & Q → All cats are dogs
# Q & R → Some dogs are pets

Step 2: Apply syllogism rules
All A are B (A) + Some B are C (I) = A + I = No definite conclusion

Step 3: Check conclusions
✗ Conclusion I: "Some cats are pets" - NOT DEFINITE
✓ Conclusion II: "All pets being cats is a possibility" - No negatives, possibility exists

Coding Pattern:
@ (All), # (Some), $ (No) represent quantifiers
& represents "are"
Letters represent categories

Answer: Only conclusion II follows

Question 18

Code Key: @ = All, # = Some, $ = No, & = are A = doctors, B = professionals, C = graduates Coded Statements: @ A & B # B & C Decoded Conclusions: I. Some doctors are graduates. II. All graduates being doctors is a possibility.

Decoding Process:

Step 1: Decode the statements
@ A & B → All doctors are professionals
# B & C → Some professionals are graduates

Step 2: Apply syllogism rules
All A are B (A) + Some B are C (I) = A + I = No definite conclusion

Step 3: Check conclusions
✗ Conclusion I: "Some doctors are graduates" - NOT DEFINITE
✓ Conclusion II: "All graduates being doctors is a possibility" - No negatives, possibility exists

Coding Pattern:
@ (All), # (Some), $ (No) represent quantifiers
& represents "are"
Letters represent categories

Answer: Only conclusion II follows

Question 19

Code Key: @ = All, # = Some, $ = No, & = are M = roses, N = flowers, O = plants Coded Statements: @ M & N # N & O Decoded Conclusions: I. Some roses are plants. II. All plants being roses is a possibility.

Decoding Process:

Step 1: Decode the statements
@ M & N → All roses are flowers
# N & O → Some flowers are plants

Step 2: Apply syllogism rules
All A are B (A) + Some B are C (I) = A + I = No definite conclusion

Step 3: Check conclusions
✗ Conclusion I: "Some roses are plants" - NOT DEFINITE
✓ Conclusion II: "All plants being roses is a possibility" - No negatives, possibility exists

Coding Pattern:
@ (All), # (Some), $ (No) represent quantifiers
& represents "are"
Letters represent categories

Answer: Only conclusion II follows

Question 20

Code Key: @ = All, # = Some, $ = No, & = are P = cats, Q = dogs, R = pets Coded Statements: @ P & Q # Q & R Decoded Conclusions: I. Some cats are pets. II. All pets being cats is a possibility.

Decoding Process:

Step 1: Decode the statements
@ P & Q → All cats are dogs
# Q & R → Some dogs are pets

Step 2: Apply syllogism rules
All A are B (A) + Some B are C (I) = A + I = No definite conclusion

Step 3: Check conclusions
✗ Conclusion I: "Some cats are pets" - NOT DEFINITE
✓ Conclusion II: "All pets being cats is a possibility" - No negatives, possibility exists

Coding Pattern:
@ (All), # (Some), $ (No) represent quantifiers
& represents "are"
Letters represent categories

Answer: Only conclusion II follows

Master Coded Syllogism - Beginner Level Problems Coded Syllogism BEGINNER

What you'll learn in this worksheet:

Question 1

Question 2

Question 3

Question 4

Question 5

Question 6

Question 7

Question 8

Question 9

Question 10

Question 11

Question 12

Question 13

Question 14

Question 15

Question 16

Question 17

Question 18

Question 19

Question 20