A) \( 18 \div 6 + 4 - 2 \div 3 = 22 \) |
B) \( 18 + 6 - 4 \times 2 \div 3 = 26 \) |
C) \( 18 \times 6 - 4 + 7 \times 8 = 47 \) |
D) \( 18 - 6 \times 7 \div 2 + 8 = 63 \) |
B) \( 18 + 6 - 4 \times 2 \div 3 = 26 \) |
\( + stands for \times \)
\( - stands for \div \)
\( \times stands for + \)
\( \div stands for - \)
Therefore, consider (B) (i.e.) \( 18 + 6 - 4 \times 2 \div 3 = 26 \)
Take LHS \( 18 \times 6 \div 4 + 2 - 3 \)
\( \Large = 18 \times \frac{6}{4} + 2 - 3 \)
\( = 27 + 2 - 3 = 26 = RHS \)