Answer: 1 ×10 1 = remainder obtained by dividing 1 × 1 by 10 = 1 3 ×10 7 = remainder obtained by dividing 3 × 7 by 10 = 1 7 ×10 9 = remainder obtained by dividing 7 × 9 by 10 = 3 Composition table:...
Construct the composition table for ×5 on set Z5 = {0, 1, 2, 3, 4}
Answer: 1 ×5 1 = remainder obtained by dividing 1 × 1 by 5 = 1 3 ×5 4 = remainder obtained by dividing 3 × 4 by 5 = 2 4 ×5 4 = remainder obtained by dividing 4 × 4 by 5 = 1 Composition table: ×5 0 1...
Construct the composition table for ×6 on set S = {0, 1, 2, 3, 4, 5}.
Answer: 1 ×6 1 = remainder obtained by dividing 1 × 1 by 6 = 1 3 ×6 4 = remainder obtained by dividing 3 × 4 by 6 = 0 4 ×6 5 = remainder obtained by dividing 4 × 5 by 6 = 2 Composition table: ×6 0 1...
Construct the composition table for +5 on set S = {0, 1, 2, 3, 4}
Answer: 1 +5 1 = remainder obtained by dividing 1 + 1 by 5 = 2 3 +5 1 = remainder obtained by dividing 3 + 1 by 5 = 2 4 +5 1 = remainder obtained by dividing 4 + 1 by 5 = 3 Composition Table: +5 0 1...
Construct the composition table for ×4 on set S = {0, 1, 2, 3}.
Answer: Given, ×4 on set S = {0, 1, 2, 3} 1 ×4 1 = remainder obtained by dividing 1 × 1 by 4 = 1 0 ×4 1 = remainder obtained by dividing 0 × 1 by 4 = 0 2 ×4 3 = remainder obtained by dividing 2 × 3...
For the binary operation set , find the inverse of 3 .
Solution: Here, $1 \times{ }_{10} 1=$ remainder obtained by dividing $1 \times 1$ by 10 $=1$ $3 \times{ }_{10} 7=$ remainder obtained by dividing $3 \times 7$ by 10 $=1$ $7 \times_{10} 9=$ remainder...
Construct the composition table for on set
Solution: Here, $1 \times_{5} 1=$ remainder obtained by dividing $1 \times 1$ by 5 $=1$ $3 \times_{5} 4=$ remainder obtained by dividing $3 \times 4$ by 5 $=2$ $4 \times_{5} 4=$ remainder obtained...
Construct the composition table for on set S = {0, 1, 2, 3, 4, 5}.
Solution: Here, $1 \times_{6} 1=$ remainder obtained by dividing $1 \times 1$ by 6 $=1$ $3 \times_{6} 4=$ remainder obtained by dividing $3 \times 4$ by 6 $=0$ $4 \times_{6} 5=$ remainder obtained...
Construct the composition table for on set S = {0, 1, 2, 3, 4}
Solution: $1+_{5} 1=$ remainder obtained by dividing $1+1$ by 5 $=2$ $3+{ }_{5} 1=$ remainder obtained by dividing $3+1$ by 5 $=2$ $4+_{5} 1=$ remainder obtained by dividing $4+1$ by 5 $=3$...
Construct the composition table for on set .
Solution: It is given that $x_{4}$ on set $S=\{0,1,2,3\}$ Here, $1 \times_{4} 1=$ remainder obtained by dividing $1 \times 1$ by 4 $=1$. $0 \times_{4} 1=$ remainder obtained by dividing $0 \times 1$...