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Content Curator | Updated On - May 31, 2024
KEAM 2022 Mathematics Question Paper with Answer Key pdf is available for download. The exam was conducted by Commissioner for Entrance Examinations (CEE) Kerala on July 4, 2022. In terms of difficulty level, KEAM Mathematics was of Easy to Moderate level. The question paper comprised a total of 120 questions.
KEAM 2022 Mathematics Question Paper with Answer Key PDFs
| KEAM 2022 Mathematics Question Paper PDF | KEAM 2022 Mathematics Answer Key PDF | KEAM 2022 Mathematics Solution PDF |
|---|---|---|
| Download PDF | Download PDF | Download PDF |
KEAM Previous Year Question Paper with Answer Key PDFs
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Similar Exam Question Papers
KEAM Questions
1. An average frictional force of 80N is required to stop an object at a distance of 25m. If the initial speed of the object is 20m/s,the mass of the object is:
An average frictional force of 80N is required to stop an object at a distance of 25m. If the initial speed of the object is 20m/s,the mass of the object is:
25Kg
12Kg
30Kg
40Kg
10Kg
2. Let \(k\) be a real number such that \(\sin \dfrac{3π}{14} \cos \dfrac{3π}{14} = k \cos \dfrac{π}{14}\).Then the value of \(4k\) is
Let \(k\) be a real number such that \(\sin \dfrac{3π}{14} \cos \dfrac{3π}{14} = k \cos \dfrac{π}{14}\).Then the value of \(4k\) is
\(1\)
\(2\)
\(3\)
\(4\)
\(0\)
3. If the coefficients of \((5r+4)th\) term and \((r-1)th\) term in the expansion of \((1+x)^{25}\) are equal, then \(r\) is
If the coefficients of \((5r+4)th\) term and \((r-1)th\) term in the expansion of \((1+x)^{25}\) are equal, then \(r\) is
\(6\)
\(3\)
\(5\)3
\(2\)
\(4\)
4. If f(z)=zn+an-1zn-1 +......+a1zn+a0 ∈ R[z] is a polynomial in z with no root over R,then deg(f)is
If f(z)=zn+an-1zn-1 +......+a1zn+a0 ∈ R[z] is a polynomial in z with no root over R,then deg(f)is
- 9
- always≤4
- an odd number
- always≥4
- an even number
5. A car moving with a velocity of 10m/s can be stopped by the application of a constant force F in a distance of 20m. If the velocity of the car is 30m/s. It can be stopped by this force in
A car moving with a velocity of 10m/s can be stopped by the application of a constant force F in a distance of 20m. If the velocity of the car is 30m/s. It can be stopped by this force in
\(\frac{20}{3}m\)
- 20 m
- 60 m
- 180 m
- 7 m
6. A thin particle moves from \((0,1)\) and gets reflected upon hitting the x-axis at \((√3,0)\). Then the slope of the reflected line is ?
A thin particle moves from \((0,1)\) and gets reflected upon hitting the x-axis at \((√3,0)\). Then the slope of the reflected line is ?
\(\dfrac{1}{√3}\)
\(\dfrac{-1}{√3}\)
\({√3}\)
\(-{√3}\)
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