Runs in match Q is 185, which is not the highest runs. Runs in P is 4 runs less than match Q. Runs in match P is more than match R but less than match T. Runs in match R is just less than match S. Runs in match R is not the least. Inference: We get runs in P is 154. Runs in match match P is less than match Q. Runs in match Q and T is more than P. Runs in R is less than match P. Runs in match T is the highest, Runs in Q, P, S and R is 2 nd, 3 rd, 4 th and 5 th highest and runs in U is the lowest. Therefore, the final arrangement is given below: T (highest) > Q (185) > P (154) > S > R > U (lowest)
120 × 195 ÷ 13 - ? = 162
140% of 1270 + 60% of 2085 = 1881 + ‘?’% of 287
1540 ÷ 7 - 184 ÷ 8 = ?
Select the correct combination of mathematical signs that can sequentially replace the * signs and balance the given equation.
42 * 7 * 64 * 11 * 6 *4
[3/5 of (31 + 44) – 10] ÷ 7 = ?
√10000 × √8100 - (50)² = √(?) + (80)²
150% of 850 ÷ 25 – 25 = ?% of (39312 ÷ 1512)
Find the HCF of 15x2 + 8x – 12, 3x² + x – 2, 3x² - 2x, 9x² - 12x + 4
(120 × ?)/(36 × 0.2) = 200
