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Maths MCQ Quiz in मल्याळम - Objective Question with Answer for Maths - സൗജന്യ PDF ഡൗൺലോഡ് ചെയ്യുക

Last updated on Mar 8, 2025

നേടുക Maths ഉത്തരങ്ങളും വിശദമായ പരിഹാരങ്ങളുമുള്ള മൾട്ടിപ്പിൾ ചോയ്സ് ചോദ്യങ്ങൾ (MCQ ക്വിസ്). ഇവ സൗജന്യമായി ഡൗൺലോഡ് ചെയ്യുക Maths MCQ ക്വിസ് പിഡിഎഫ്, ബാങ്കിംഗ്, എസ്എസ്‌സി, റെയിൽവേ, യുപിഎസ്‌സി, സ്റ്റേറ്റ് പിഎസ്‌സി തുടങ്ങിയ നിങ്ങളുടെ വരാനിരിക്കുന്ന പരീക്ഷകൾക്കായി തയ്യാറെടുക്കുക

Latest Maths MCQ Objective Questions

Top Maths MCQ Objective Questions

Maths Question 1:

The cosine of angle C in a right triangle is \( \frac{5}{13} \). Find the sine of the angle that complements C.

  1. \( \frac{5}{13} \)
  2. \( \frac{12}{13} \)
  3. \( \frac{13}{5} \)
  4. \( \frac{1}{2} \)

Answer (Detailed Solution Below)

Option 1 : \( \frac{5}{13} \)

Maths Question 1 Detailed Solution

The sine of an angle is equal to the cosine of its complementary angle. Therefore, \( \sin(90^\circ - C) = \cos(C) = \frac{5}{13} \). So, the sine of the angle complementary to C is \( \frac{5}{13} \), making option 1 correct. Option 2 is the sine of angle C itself, not its complement. Options 3 and 4 are incorrect as they do not correspond to the given trigonometric ratios.

Maths Question 2:

What is the median of the following data set: 5, 11, 15, 18, 22?

  1. 11
  2. 13
  3. 15
  4. 18

Answer (Detailed Solution Below)

Option 3 : 15

Maths Question 2 Detailed Solution

To find the median, we need to arrange the data in ascending order (which it already is) and find the middle value. Since there are 5 numbers, the median is the third number in the sorted list. Thus, the median is 15. Option 1 is incorrect as 11 is the first quartile, not the median. Option 2 is incorrect as 13 does not appear in the data set. Option 4 is incorrect as 18 is the fourth value, not the middle one. Therefore, the correct answer is 15.

Maths Question 3:

A teacher recorded the following test scores: 55, 60, 65, 70, 75, 80, 85. What is the median score?

  1. 65
  2. 70
  3. 75
  4. 80

Answer (Detailed Solution Below)

Option 2 : 70

Maths Question 3 Detailed Solution

To find the median, list the scores in ascending order, which is already done: 55, 60, 65, 70, 75, 80, 85. The median is the value in the middle of a data set. With 7 values, the median is the 4th number, which is 70. Therefore, option 2 (70) is correct. Options 1 (65), 3 (75), and 4 (80) are incorrect because they do not represent the middle value in the ordered list.

Maths Question 4:

In a study, two groups of athletes were tested for their maximum oxygen uptake levels. The data for each group is summarized in the table below.

| Group | Sample Size | Mean (ml/kg/min) | Standard Deviation (ml/kg/min) |

|-------|-------------|------------------|---------------------------------|

| C | 1,800 | 50 | 8.5 |

| D | 1,800 | 50 | 12.3 |

Which of the following statements is true based on the table?

  1. The Group C data set was identical to the Group D data set.
  2. Group D had more consistent oxygen uptake levels than Group C.
  3. The spread of oxygen uptake levels was greater in Group D than in Group C.
  4. The median oxygen uptake level of Group D is higher than that of Group C.

Answer (Detailed Solution Below)

Option 3 : The spread of oxygen uptake levels was greater in Group D than in Group C.

Maths Question 4 Detailed Solution

The correct answer is option 3. The standard deviation is a measure of the spread of data points around the mean. A larger standard deviation indicates that the data points are more spread out. Here, Group D has a standard deviation of 12.3 ml/kg/min, which is larger than the standard deviation of Group C, which is 8.5 ml/kg/min. This means that the oxygen uptake levels in Group D have a larger spread compared to Group C.

Option 1 is incorrect because identical data sets would have identical means and standard deviations, which is not the case here.

Option 2 is incorrect because a larger standard deviation in Group D indicates less consistency, not more.

Option 4 is incorrect because the problem does not provide information about medians, and the means are identical, so we cannot infer anything about the medians.

Maths Question 5:

A list of 60 numbers has a mean of 25 and a median of 30. If all numbers above the median are tripled and all numbers below the median are halved, which statistical measure is altered?

  1. Median
  2. Mean
  3. Total sum
  4. Standard deviation

Answer (Detailed Solution Below)

Option 4 : Standard deviation

Maths Question 5 Detailed Solution

Tripling all numbers above the median and halving all numbers below the median results in a significant change in the spread of the data. The median remains unchanged as it is the central value of the ordered list. The mean, which depends on the total sum, will change due to the drastic modifications in individual values. The total sum changes as the transformations alter the overall sum of the data. The standard deviation, which measures the spread of the data points from the mean, will definitely increase due to the increased variability in the data. Thus, the standard deviation is altered.

Maths Question 6:

The ratio \(\frac{c}{d} = 6\) and \(\frac{72c}{kd} = 6\). Find \(k\).

  1. 12
  2. 6
  3. 72
  4. 36

Answer (Detailed Solution Below)

Option 3 : 72

Maths Question 6 Detailed Solution

The ratio \(\frac{c}{d} = 6\) implies \(c = 6d\). Substituting into the equation \(\frac{72c}{kd} = 6\), we have \(\frac{72(6d)}{kd} = 6\). Simplifying gives \(\frac{432d}{kd} = 6\). Canceling \(d\) results in \(\frac{432}{k} = 6\). Solving for \(k\), multiply both sides by \(k\) to get \(432 = 6k\). Dividing both sides by 6, \(k = 72\). Therefore, \(k\) is 72.

Maths Question 7:

For the function \( j(x) = x^2 + 6x + 9 \), find the value of \( x \) when \( j(x) = 0 \).

  1. 3
  2. -3
  3. 0
  4. -9

Answer (Detailed Solution Below)

Option 2 : -3

Maths Question 7 Detailed Solution

The given function is \( j(x) = x^2 + 6x + 9 \). We set \( j(x) = 0 \), resulting in \( x^2 + 6x + 9 = 0 \). This can be factored as \( (x + 3)^2 = 0 \), giving \( x = -3 \). Therefore, the correct option is -3, which is option 2. This shows that the quadratic has a repeated root at \( x = -3 \).

Maths Question 8:

A scientist observes that a certain chemical reaction doubles in concentration every 2 hours. If the initial concentration is \(0.5\) moles per liter, what is the concentration after 8 hours?

  1. 1 moles per liter
  2. 2 moles per liter
  3. 4 moles per liter
  4. 8 moles per liter

Answer (Detailed Solution Below)

Option 4 : 8 moles per liter

Maths Question 8 Detailed Solution

The concentration doubles every 2 hours. After 8 hours, the concentration will have doubled \(\frac{8}{2} = 4\) times. The concentration is given by the formula \(C = 0.5 \times 2^n\), where \(n\) is the number of doubling periods. Substituting \(n = 4\), we have \(C = 0.5 \times 2^4 = 0.5 \times 16 = 8\) moles per liter. Therefore, the concentration after 8 hours is 8 moles per liter. Option 1 is incorrect because it represents the concentration after 2 hours. Option 2 is incorrect because it represents the concentration after 4 hours. Option 3 is incorrect because it represents the concentration after 6 hours.

Maths Question 9:

If a worker earns $12 per hour and has earned a total of $96, how many hours has the worker worked?

  1. 6
  2. 7
  3. 8
  4. 9

Answer (Detailed Solution Below)

Option 3 : 8

Maths Question 9 Detailed Solution

The worker earns $12 per hour and has earned a total of $96. The equation \(12h = 96\), where \(h\) is the number of hours worked, helps us find the solution. Dividing both sides by 12 gives \(h = 8\). Therefore, the worker has worked for 8 hours. The correct answer is option 3. Options 1, 2, and 4 may result from errors in dividing or setting up the equation correctly.

Maths Question 10:

If a cyclist covers a distance of 90 miles at a constant speed of 15 miles per hour, how long does the journey take?

  1. 4
  2. 5
  3. 6
  4. 7

Answer (Detailed Solution Below)

Option 3 : 6

Maths Question 10 Detailed Solution

The cyclist travels 15 miles each hour and covers a total of 90 miles. The equation is \(15t = 90\), where \(t\) is the time in hours. Solving for \(t\), we divide both sides by 15, yielding \(t = 6\). Therefore, the journey takes 6 hours. The correct answer is option 3. Choices 1, 2, and 4 could arise from setting up the equation incorrectly or making mistakes in calculation.

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