Maths-
General
Easy
Question
Calculate MAD for first six natural numbers
- 3.5
- 2.5
- 1.5
- 4.5
The correct answer is: 2.5
![text mean end text equals fraction numerator 1 plus 2 plus 3 plus 4 plus 5 plus 6 over denominator 6 end fraction equals 21 over 6 equals 3.5](data:image/png;base64,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)
direction =-2.5,-1.5,+0.5,105,2.5,0.5,
![text MAD end text equals fraction numerator vertical line minus 2.5 vertical line plus vertical line minus 1.5 vertical line plus 0.5 plus 1.5 plus 2.5 plus fraction numerator 10 over denominator 0.5 end fraction ∣= 9 over 6 over denominator 6 end fraction space equals 1.5 space](data:image/png;base64,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)
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Maths-
Which point represents (-3,2)
![](data:image/png;base64,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)
Which point represents (-3,2)
![](data:image/png;base64,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)
Maths-General
Maths-
Which of the following is the equation for distance between two points.
Which of the following is the equation for distance between two points.
Maths-General
Maths-
Find the volume of triangular prison of length 15 cm and base area 6 cm2.
Find the volume of triangular prison of length 15 cm and base area 6 cm2.
Maths-General
Maths-
Find the distance between A and B
![](data:image/png;base64,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)
Find the distance between A and B
![](data:image/png;base64,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)
Maths-General