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Below are the scanned copy of Kerala Public Service Commission (KPSC) Question Paper with answer keys of Exam Name 'HSST PHYSICS SR FOR SC/ST KHSE' And exam conducted in the year 2016. And Question paper code was '073/2016/OL'. Medium of question paper was in Malayalam or English . Booklet Alphacode was 'A'. Answer keys are given at the bottom, but we suggest you to try answering the questions yourself and compare the key along wih to check your performance. Because we would like you to do and practice by yourself.
B:-Akkamma Cheriyan
C:-Arya Pallam
D:-AV Kuttimalu Amma
Correct Answer:- Option-A
Question10:-'Rashtriya Ekta Diwas' was observed on 31st October 2014 to commemorate the birth anniversary of ...7
A:-Dadabhai Naoroji
B:-Gopalakrishna Gokhale
C:-Sardar Vallabhbhai Patel
D:-Mahatma Gandhi
Correct Answer:- Option-C
Question11:-The eigen value of the matrix A= *[[costheta,-sintheta].[sintheta,costhetall’ is
கலரை +2
8:26
C:-exp 68
D:-exp=i8
Correct Answer:- Option-D
Question12:- The necessary condition for the function f (Z) to be analytic at the point Z is
AU/ dy= 3۷| 8× إلاۃ ٤3۳۲ न 3۷/۱ १४
8:-94/9 >= ०५/०४ चाध ०४० जन - 6/8
C:-Uf ox= 8 ಟಿ / ೫ 2೧6 ೫೪/3 += - ०५ 9४
மப லை ப 9y ೩೧೮ ೫11 ೫ಎ - 801 ಈ
Correct Answer:- Option-B
Question13:-The residue of “z/{{z-a}(z-b)}" at infinity is
ಹಿಂಗಿ
B:--b/a
6:1
0-1
Correct Answer:- Option-D
Question14:- Which one of the following is a tensor of order zero, if A and B are vectors?
A:-A+B
B:-A-B
C-A.B
D:-AxB
Correct Answer:- Option-C
Question15:- Aij and Bij represent symmetric and anti symmetric real valued tensor respectively in three dimension. The
number of independent components of Aij and Bij are
A:-3and 6
B:-6and 3
C:-6 and6
0:- 6
Correct Answer:- Option-B
Question16:-If F(s} is the Laplace transform of F {t} the Laplace transform of F (at} is
ക് 76)
8:-`7/'(5/9)
೦-೯6)
0:68)
Correct Answer:- Option-B
Question17:-The matrix *[[0,-1,0],[1,0,0L[0,0,111" is
A:-orthogonal
B:-hermitian
C:-anti symmetric
D:-None of the above
Correct Answer:- Option-A
Question18:-If H is Hermitian matrix then exp(iH} will be
A:-hermitian
B:-anti hermitian
C:-unitary
D:-orthogonal
Correct Answer:- Option-C