`sqrtv` versus Z graph for characteristic X-rays is as shown in figure. Match the following :

`{:(,"Column I",,"Column II"),((A),"Line-1",(p),L_(alpha)),((B),"Line-2",(q),L_(beta)),((C),"Line-3",(r),K_(alpha)),((D),"Line-4",(s),K_(beta)):}`.

sqrtv versus z graph for characteristic X-rays is as shown in the figure. Match the following

Match the following : {:(,"Column-I",,"Column-II"),((A),3s^(1),(p),n=3),((B), 3p^(1),(q), l=0),((C ), 4s^(1),(r ) , l=1),((D),4d^(1),(s),m=0),(,,(t),m=+-1):}

{:(,"Column I",,"Column II"),(("A"),R//L,(p),"Time"),(("B"),C//R,(q),"Frequency"),(("C"),E//B,(r),"Speed"),(("D"),sqrt(epsilon_(0)mu_(0)),(s),"None"):}

Match Column - I with Column - II {:(,P,Q,R,S),((A),1,2,4,3),((B),2,1,4,3),((C ),4,1,3,2),((D ),4,3,2,1):}

In normal YDSE experiment maximum intensity is 4I_(0) in Column I, y-coordinate is given corresponding to centre line In Coloum II resultant intensities are given Match the two columns. {:(,"Column I",,"Column II"),("A",y=(lambdaD)/d,,p. I=I_(0)),("B",y=(lambdaD)/(2d),,q. I=2I_(0)),("C",y=(lambdaD)/(3d),,r. I=4I_(0)),("D",y=(lambdaD)/(4d),,s. I=zero):}

Column I shows distributionof electric field liness and column II shows charge distribution . Match the columns. {:(,"Column I ",,"Column II"),((A),"Straight lines but not parallel",(p),"Uniformly distributed charged shell"),((B), "Straight lines but parallel ",(q),"Uniformly distributed charged long rod"),((C ),"Curved lines",(r ),"Uniformly distributed infinite charged sheet"),((D), "Some regions where no lines are present",(s),"Electric dipole"),(,,(t),"Any conducting material"):}

Match the rate law given in column I with the dimensions of rate constants given in column II and mark the appropriate choice. {:("Column I","Column II"),((A) "Rate" = k[NH_(3)]^(0),(i) mol L^(-1) s^(-1)),((B)"Rate" = k[H_(2)O_(2)][I^(-)],(ii) L mol^(-1) s^(-1)),((C )"Rate" = k[CH_(3)CHO]^(3//2),(iii) S^(-1)),((D) "Rate" = k [C_(5)H_(5)CI],(iv)L^(1//2) mol^(-1//2) s^(-1)):}

The graph given below, shows the variation of sqrt(f) vs z for characteristics X- rays. Lines 1,2,3 and 4 shown in the graph corresponds to any one of K_(alpha) , K_(beta) , L_(alpha) , L_(beta) emission, then L_(beta) is represented by ( f = frequency, z = Atomic number)

If alpha, beta, gamma be the roots of the equation x(1+x^(2))+x^(2)(6+x)+2=0 then match the entries of column-I with those of column-II. {:("column-I" , " Column -II"),("(A) " alpha^(-1)+beta^(-1)+gamma^(-1) " is equal to " , "(p) 8"),("(B)" alpha^(2)+beta^(2)+gamma^(2)" equals" , "(q)" -1/2),("(C)"(alpha^(-1)+beta^(-1)+gamma^(-1))-(alpha+beta+gamma) " is equal to " , "(r) -1"),("(D)"[alpha^(-1)+beta^(-1)+gamma^(-1)] " equals where [.] denotes the greatest integer equal to " , "(t)" 5/2):}

Match the following columns, {:("Column1","Column2"),("a Thermal resitance","p [MT^(-3)K^(-4)]"),("b Stefan's constant","q [M^(-1)L^(-2)T^(3)K]"),("c Wien's constant","r [ML^(2)T^(-3)]"),("d Heat current","s [LK]"):}