8666 + Mcqs in Mathematics Page 133 McqOptions

6601.	For the following shaded area, the linear constraints except \[x\ge 0\] and \[y\ge 0\], are
A.	\[2x+y\le 2,\ x-y\le 1,\ x+2y\le 8\]
B.	\[2x+y\ge 2,\ x-y\le 1,\ x+2y\le 8\]
C.	\[2x+y\ge 2,\ x-y\ge 1,\ x+2y\le 8\]
D.	\[2x+y\ge 2,\ x-y\ge 1,\ x+2y\ge 8\]
Answer» C. \[2x+y\ge 2,\ x-y\ge 1,\ x+2y\le 8\]

Discussion

6602.	The mean of the values 0, 1, 2,......,n having corresponding weight \[^{n}{{C}_{0}},{{\,}^{n}}{{C}_{1}},{{\,}^{n}}{{C}_{2}},........\,,{{\,}^{n}}{{C}_{n}}\] respectively is [AMU 1990; CET 1998]
A.	\[\frac{{{2}^{n}}}{n+1}\]
B.	\[\frac{{{2}^{n+1}}}{n(n+1)}\]
C.	\[\frac{n+1}{2}\]
D.	\[\frac{n}{2}\]
Answer» E.

Discussion

6603.	The mean of n items is \[\bar{x}\]. If the first term is increased by 1, second by 2 and so on, then new mean is [DCE 1998]
A.	\[\bar{x}+n\]
B.	\[\bar{x}+\frac{n}{2}\]
C.	\[\bar{x}+\frac{n+1}{2}\]
D.	None of these
Answer» D. None of these

Discussion

6604.	The degree of the differential equation \[3\frac{{{d}^{2}}y}{d{{x}^{2}}}={{\left\{ 1+{{\left( \frac{dy}{dx} \right)}^{2}} \right\}}^{3/2}}\] is [MP PET 1994, 95]
A.	1
B.	2
C.	3
D.	6
Answer» C. 3

Discussion

6605.	\[\int_{{}}^{{}}{\frac{dx}{\sqrt{x+a}+\sqrt{x+b}}}=\] [AISSE 1989]
A.	\[\frac{2}{3(b-a)}[{{(x+a)}^{3/2}}-{{(x+b)}^{3/2}}]+c\]
B.	\[\frac{2}{3(a-b)}[{{(x+a)}^{3/2}}-{{(x+b)}^{3/2}}]+c\]
C.	\[\frac{2}{3(a-b)}[{{(x+a)}^{3/2}}+{{(x+b)}^{3/2}}]+c\]
D.	None of these
Answer» C. \[\frac{2}{3(a-b)}[{{(x+a)}^{3/2}}+{{(x+b)}^{3/2}}]+c\]

Discussion

6606.	\[\int_{{}}^{{}}{\frac{dx}{\cos (x-a)\cos (x-b)}=}\]
A.	\[\text{cosec}\,\,(a-b)\log \frac{\sin (x-a)}{\sin (x-b)}+c\]
B.	\[\text{cosec}(a-b)\log \frac{\cos (x-a)}{\cos (x-b)}+c\]
C.	\[\text{cosec}(a-b)\log \frac{\sin (x-b)}{\sin (x-a)}+c\]
D.	\[\text{cosec}(a-b)\log \frac{\cos (x-b)}{\cos (x-a)}+c\]
Answer» C. \[\text{cosec}(a-b)\log \frac{\sin (x-b)}{\sin (x-a)}+c\]

Discussion

6607.	If \[y=\frac{x}{2}\sqrt{{{a}^{2}}+{{x}^{2}}}+\frac{{{a}^{2}}}{2}\log (x+\sqrt{{{x}^{2}}+{{a}^{2}}})\],then \[\frac{dy}{dx}=\] [AISSE 1983]
A.	\[\sqrt{{{x}^{2}}+{{a}^{2}}}\]
B.	\[\frac{1}{\sqrt{{{x}^{2}}+{{a}^{2}}}}\]
C.	\[2\sqrt{{{x}^{2}}+{{a}^{2}}}\]
D.	\[\frac{2}{\sqrt{{{x}^{2}}+{{a}^{2}}}}\]
Answer» B. \[\frac{1}{\sqrt{{{x}^{2}}+{{a}^{2}}}}\]

Discussion

6608.	\[\frac{d}{dx}{{\tan }^{-1}}\left[ \frac{\cos x-\sin x}{\cos x+\sin x} \right]=\] [AISSE 1985, 87; DSSE 1982,84; MNR 1985; Karnataka CET 2002; RPET 2002, 03]
A.	\[\frac{1}{2\,\,(1+{{x}^{2}})}\]
B.	\[\frac{1}{1+{{x}^{2}}}\]
C.	1
D.	-1
Answer» E.

Discussion

6609.	If \[f(x)=\frac{{{\cos }^{2}}x+{{\sin }^{4}}x}{{{\sin }^{2}}x+{{\cos }^{4}}x}\] for \[x\in R\], then \[f(2002)=\] [EAMCET 2002]
A.	1
B.	2
C.	3
D.	4
Answer» B. 2

Discussion

6610.	The projection of any line on co-ordinate axes be respectively 3, 4, 5 then its length is [MP PET 1995; RPET 2001]
A.	12
B.	50
C.	\[5\sqrt{2}\]
D.	None of these
Answer» D. None of these

Discussion

6611.	The direction cosines of a line segment \[AB\] are \[-2/\sqrt{17},\] \[3/\sqrt{17},\,\,-2/\sqrt{17}.\] If \[AB=\sqrt{17}\] and the co-ordinates of A are (3, -6, 10), then the co-ordinates of B are
A.	(1, -2, 4)
B.	(2, 5, 8)
C.	(-1, 3, -8)
D.	(1, -3, 8)
Answer» E.

Discussion

6612.	Three forces of magnitudes 1, 2, 3 dynes meet in a point and act along diagonals of three adjacent faces of a cube. The resultant force is [MNR 1987]
A.	114 dyne
B.	6 dyne
C.	5 dyne
D.	None of these
Answer» D. None of these

Discussion

6613.	The number of ways of dividing 52 cards amongst four players so that three players have 17 cards each and the fourth player just one card, is [IIT 1979]
A.	\[\frac{52\ !}{{{(17\ !)}^{3}}}\]
B.	\[52\ !\]
C.	\[\frac{52\ !}{17\ !}\]
D.	None of these
Answer» B. \[52\ !\]

Discussion

6614.	Ten different letters of an alphabet are given. Words with five letters are formed from these given letters. Then the number of words which have at least one letter repeated is [IIT 1980; MNR 1998, 99; DCE 2001]
A.	69760
B.	30240
C.	99748
D.	None of these
Answer» B. 30240

Discussion

6615.	If \[^{56}{{P}_{r+6}}{{:}^{54}}{{P}_{r+3}}=30800:1\], then \[r=\] [Roorkee 1983; Kurukshetra CEE 1998]
A.	31
B.	41
C.	51
D.	None of these
Answer» C. 51

Discussion

6616.	There are four balls of different colours and four boxes of colours same as those of the balls. The number of ways in which the balls, one in each box, could be placed such that a ball does not go to box of its own colour is [IIT 1992]
A.	8
B.	7
C.	9
D.	None of these
Answer» D. None of these

Discussion

6617.	A dictionary is printed consisting of 7 lettered words only that can be made with a letter of the word CRICKET. If the words are printed at the alphabetical order, as in an ordinary dictionary, then the number of word before the word CRICKET is [Orissa JEE 2003]
A.	530
B.	480
C.	531
D.	481
Answer» B. 480

Discussion

6618.	How many different nine-digit numbers can be formed from the digits of the number 223355888 by rearrangement of the digits so that the odd digits occupy even places [IIT Screening 2000; Karnataka CET 2002]
A.	16
B.	36
C.	60
D.	180
Answer» D. 180

Discussion

6619.	The number of positive integral solutions of \[a\,b\,c=30\]is [UPSEAT 2001]
A.	30
B.	27
C.	8
D.	None of these
Answer» C. 8

Discussion

6620.	For \[2\le r\le n,\left( \begin{matrix} n \\ r \\ \end{matrix} \right)+2\,\left( \begin{align} & \,\,n \\ & r-1 \\ \end{align} \right)\]\[+\left( \begin{matrix} n \\ r-2 \\ \end{matrix} \right)\] is equal to [IIT Screening 2000; Pb. CET 2000]
A.	\[\left( \begin{matrix} n+1 \\ r-1 \\ \end{matrix} \right)\]
B.	\[2\,\left( \begin{matrix} n+1 \\ r+1 \\ \end{matrix} \right)\]
C.	\[2\,\left( \begin{matrix} n+2 \\ r \\ \end{matrix} \right)\]
D.	\[\left( \begin{matrix} n+2 \\ r \\ \end{matrix} \right)\]
Answer» E.

Discussion

6621.	If \[x,\ y\] and \[r\] are positive integers, then \[^{x}{{C}_{r}}{{+}^{x}}{{C}_{r-1}}^{y}{{C}_{1}}{{+}^{x}}{{C}_{r-2}}^{y}{{C}_{2}}+.......{{+}^{y}}{{C}_{r}}=\] [Karnataka CET 1993; RPET 2001]
A.	\[\frac{x\ !\ y\ !}{r\ !}\]
B.	\[\frac{(x+y)\ !}{r\ !}\]
C.	\[^{x+y}{{C}_{r}}\]
D.	\[^{xy}{{C}_{r}}\]
Answer» D. \[^{xy}{{C}_{r}}\]

Discussion

6622.	How many numbers between 5000 and 10,000 can be formed using the digits 1, 2, 3, 4, 5, 6, 7, 8, 9 each digit appearing not more than once in each number [Karnataka CET 1993]
A.	\[5{{\times }^{8}}{{P}_{3}}\]
B.	\[5{{\times }^{8}}{{C}_{3}}\]
C.	\[5\ !\ {{\times }^{8}}{{P}_{3}}\]
D.	\[5\ !\ {{\times }^{8}}{{C}_{3}}\]
Answer» B. \[5{{\times }^{8}}{{C}_{3}}\]

Discussion

6623.	12 persons are to be arranged to a round table. If two particular persons among them are not to be side by side, the total number of arrangements is [EAMCET 1994]
A.	\[9(10\ !)\]
B.	\[2(10\ !)\]
C.	\[45(8\ !)\]
D.	\[10\ !\]
Answer» B. \[2(10\ !)\]

Discussion

6624.	There are \[(n+1)\] white and \[(n+1)\] black balls each set numbered 1 to \[n+1\]. The number of ways in which the balls can be arranged in a row so that the adjacent balls are of different colours is [EAMCET 1991]
A.	\[(2n+2)\ !\]
B.	\[(2n+2)\ !\ \times 2\]
C.	\[(n+1)\ !\ \times 2\]
D.	\[2{{\{(n+1)\ !\}}^{2}}\]
Answer» E.

Discussion

6625.	A car will hold 2 in the front seat and 1 in the rear seat. If among 6 persons 2 can drive, then the number of ways in which the car can be filled is
A.	10
B.	20
C.	30
D.	None of these
Answer» C. 30

Discussion

6626.	A library has \[a\] copies of one book, \[b\] copies of each of two books, \[c\] copies of each of three books and single copies of \[d\] books. The total number of ways in which these books can be distributed is
A.	\[\frac{(a+b+c+d)\ !}{a\ !\ b\ !\ c\ !}\]
B.	\[\frac{(a+2b+3c+d)\ !}{a\ !\ {{(b\ !)}^{2}}{{(c\ !)}^{3}}}\]
C.	\[\frac{(a+2b+3c+d)\ !}{a\ !\ b\ !\ c\ !}\]
D.	None of these
Answer» C. \[\frac{(a+2b+3c+d)\ !}{a\ !\ b\ !\ c\ !}\]

Discussion

6627.	A father with 8 children takes them 3 at a time to the Zoological gardens, as often as he can without taking the same 3 children together more than once. The number of times each child will go to the garden is
A.	56
B.	21
C.	112
D.	None of these
Answer» C. 112

Discussion

6628.	There were two women participating in a chess tournament. Every participant played two games with the other participants. The number of games that the men played between themselves proved to exceed by 66 the number of games that the men played with the women. The number of participants is
A.	6
B.	11
C.	13
D.	None of these
Answer» D. None of these

Discussion

6629.	The number of times the digit 5 will be written when listing the integers from 1 to 1000 is
A.	271
B.	272
C.	300
D.	None of these
Answer» D. None of these

Discussion

6630.	There are 10 persons named \[A,\ B,.......J\]. We have the capacity to accommodate only 5. In how many ways can we arrange them in a line if \[A\] is must and \[G\] and \[H\] must not be included in the team of 5
A.	\[^{8}{{P}_{5}}\]
B.	\[^{7}{{P}_{5}}\]
C.	\[^{7}{{C}_{3}}(4\ !)\]
D.	\[^{7}{{C}_{3}}(5\ !)\]
Answer» E.

Discussion

6631.	How many words can be made from the letters of the word BHARAT in which B and H never come together [IIT 1977]
A.	360
B.	300
C.	240
D.	120
Answer» D. 120

Discussion

6632.	In how many ways can a committee be formed of 5 members from 6 men and 4 women if the committee has at least one woman [RPET 1987; IIT 1968; Pb. CET 2003]
A.	186
B.	246
C.	252
D.	None of these
Answer» C. 252

Discussion

6633.	Five balls of different colours are to be placed in three boxes of different sizes. Each box can hold all five balls. In how many ways can we place the balls so that no box remains empty [IIT 1981]
A.	50
B.	100
C.	150
D.	200
Answer» D. 200

Discussion

6634.	The number of times the digit 3 will be written when listing the integers from 1 to 1000 is
A.	269
B.	300
C.	271
D.	302
Answer» C. 271

Discussion

6635.	In a certain test there are \[n\] questions. In the test \[{{2}^{n-i}}\] students gave wrong answers to at least \[i\] questions, where \[i=1,\ 2,\ ......n\]. If the total number of wrong answers given is 2047, then \[n\] is equal to
A.	10
B.	11
C.	12
D.	13
Answer» C. 12

Discussion

6636.	A five digit number divisible by 3 has to formed using the numerals 0, 1, 2, 3, 4 and 5 without repetition. The total number of ways in which this can be done is [IIT 1989; AIEEE 2002]
A.	216
B.	240
C.	600
D.	3125
Answer» B. 240

Discussion

6637.	\[m\] men and n women are to be seated in a row so that no two women sit together. If \[m>n\], then the number of ways in which they can be seated is [IIT 1983]
A.	\[\frac{m\ !\ (m+1)\ !}{(m-n+1)\ !}\]
B.	\[\frac{m\ !\ (m-1)\ !}{(m-n+1)\ !}\]
C.	\[\frac{(m-1)\ !\ (m+1)\ !}{(m-n+1)\ !}\]
D.	None of these
Answer» B. \[\frac{m\ !\ (m-1)\ !}{(m-n+1)\ !}\]

Discussion

6638.	A box contains two white balls, three black balls and four red balls. In how many ways can three balls be drawn from the box if at least one black ball is to be included in the draw [IIT 1986; DCE 1994]
A.	64
B.	45
C.	46
D.	None of these
Answer» B. 45

Discussion

6639.	The number of ways in which the letters of the word ARRANGE can be arranged such that both R do not come together is [MP PET 1993]
A.	360
B.	900
C.	1260
D.	1620
Answer» C. 1260

Discussion

6640.	The value of \[{{2}^{n}}\,\{1.3.5.....(2n-3)\,(2n-1)\}\] is
A.	\[\frac{(2n)\,!}{n\,!}\]
B.	\[\frac{(2n)\,!}{{{2}^{n}}}\]
C.	\[{{2}^{n-i}}\]
D.	None of these
Answer» B. \[\frac{(2n)\,!}{{{2}^{n}}}\]

Discussion

6641.	Function \[f(x)=\frac{1-\cos 4x}{8{{x}^{2}}},\] where \[x\ne 0\]and \[f(x)=k\] where \[x=0\] is a continous function at \[x=0\]then the value of k will be [AMU 2005]
A.	\[k=0\]
B.	\[k=1\]
C.	\[k=-1\]
D.	None of these
Answer» C. \[k=-1\]

Discussion

6642.	If \[f(x)=\left\{ \begin{align} & \,\,\,\,\,\,\,{{e}^{x}};\,\,\,\,x\le 0 \\ & \|1-x\|;\,\,x>0 \\ \end{align} \right.\], then [Roorkee 1995]
A.	\[f(x)\] is differentiable at \[x=0\]
B.	\[f(x)\] is continuous at \[x=0\]
C.	\[f(x)\] is differentiable at \[x=1\]
D.	\[f(x)\] is continuous at \[x=1\]
Answer» C. \[f(x)\] is differentiable at \[x=1\]

Discussion

6643.	If \[f(x)=\left\{ \begin{align} & ({{x}^{2}}/a)-a,\ \ \text{when}\ xa \\ \end{align} \right.\] then
A.	\[\underset{x\to a}{\mathop{\lim }}\,f(x)=a\]
B.	\[f(x)\]is continuous at\[x=a\]
C.	\[f(x)\]is discontinuous at\[x=a\]
D.	None of these
Answer» C. \[f(x)\]is discontinuous at\[x=a\]

Discussion

6644.	If \[f(x)=\]\[\left\{ \begin{align} & \frac{1-(x)}{1+x},\,\,\,\,\,x\ne -1 \\ & \,\,1\,\,\,\,\,\,\,\,\,,\,\,\,\,\,x=-1 \\ \end{align} \right.\], then the value of \[f(\|2k\|)\]will be (where [ ] shows the greatest integer function) [DCE 2005]
A.	Continuous at \[x=-1\]
B.	Continuous at \[x=0\]
C.	Discontinuous at \[x=\frac{1}{2}\]
D.	All of these
Answer» E.

Discussion

6645.	The function \[f(x)=\frac{2{{x}^{2}}+7}{{{x}^{3}}+3{{x}^{2}}-x-3}\]is discontinuous for [J&K 2005]
A.	\[x=1\] only
B.	\[x=1\] and \[x=-1\] only
C.	\[x=1,x=-1,x=-3\] only
D.	\[x=1,x=-1,x=-3\] and other values of x
Answer» D. \[x=1,x=-1,x=-3\] and other values of x

Discussion

6646.	The value of f at \[x=0\] so that the function \[f(x)=\frac{{{2}^{x}}-{{2}^{-x}}}{x},x\ne 0\], is continuous at \[x=0\], is [Kerala (Engg.) 2005]
A.	0
B.	log 2
C.	4
D.	\[{{e}^{4}}\]
E.	log 4
Answer» F.

Discussion

6647.	In the function \[f(x)=\frac{2x-{{\sin }^{-1}}x}{2x+{{\tan }^{-1}}x},\ (x\ne 0)\]is continuous at each point of its domain, then the value of \[f(0)\] is [RPET 2000]
A.	2
B.	\[1/3\]
C.	\[2/3\]
D.	\[-1/3\]
Answer» C. \[2/3\]

Discussion

6648.	The function \[f(x)=\|x\|+\frac{\|x\|}{x}\] is [Karnataka CET 2003]
A.	Continuous at the origin
B.	Discontinuous at the origin because \|x\| is discontinuous there
C.	Discontinuous at the origin because \[\frac{\|x\|}{x}\] is discontinuous there
D.	Discontinuous at the origin because both \|x\| and \[\frac{\|x\|}{x}\] are discontinuous there
Answer» D. Discontinuous at the origin because both \|x\| and \[\frac{\|x\|}{x}\] are discontinuous there

Discussion

6649.	For the function \[f(x)=\left\{ \begin{align} & \frac{{{e}^{1/x}}-1}{{{e}^{1/x}}+1},\,\,x\ne 0 \\ & 0\,\,\,\,\,\,\,\,\,\,\,\,\,\,\,\,,\,\,x=0 \\ \end{align} \right.\], which of the following is correct [MP PET 2004]
A.	\[\underset{x\to 0}{\mathop{\lim }}\,f(x)\]does not exist
B.	\[f(x)\]is continuous at \[x=0\]
C.	\[\underset{x\to 0}{\mathop{\lim }}\,f(x)=1\]
D.	\[\underset{x\to 0}{\mathop{\lim }}\,f(x)\]exists but \[f(x)\]is not continuous at \[x=0\]
Answer» E.

Discussion

6650.	A function f on R into itself is continuous at a point a in R, iff for each \[\in >0\], there exists, \[\delta >0\]such that [UPSEAT 2004]
A.	\[\|f(x)-f(a)\|<\in \]Þ\[\|x-a\|<\delta \]
B.	\[\|f(x)-f(a)\|>\in \]Þ\[\|x-a\|>\delta \]
C.	\[\|x-a\|>\delta \]Þ\[\|f(x)-f(a)\|>\in \]
D.	\[\|x-a\|<\delta \]Þ\[\|f(x)-f(a)\|<\in \]
Answer» B. \[\|f(x)-f(a)\|>\in \]Þ\[\|x-a\|>\delta \]

Discussion

Explore topic-wise MCQs in Joint Entrance Exam - Main (JEE Main).

For the following shaded area, the linear constraints except \[x\ge 0\] and \[y\ge 0\], are

The mean of the values 0, 1, 2,......,n having corresponding weight \[^{n}{{C}_{0}},{{\,}^{n}}{{C}_{1}},{{\,}^{n}}{{C}_{2}},........\,,{{\,}^{n}}{{C}_{n}}\] respectively is [AMU 1990; CET 1998]

The mean of n items is \[\bar{x}\]. If the first term is increased by 1, second by 2 and so on, then new mean is [DCE 1998]

The degree of the differential equation \[3\frac{{{d}^{2}}y}{d{{x}^{2}}}={{\left\{ 1+{{\left( \frac{dy}{dx} \right)}^{2}} \right\}}^{3/2}}\] is [MP PET 1994, 95]

\[\int_{{}}^{{}}{\frac{dx}{\sqrt{x+a}+\sqrt{x+b}}}=\] [AISSE 1989]

\[\int_{{}}^{{}}{\frac{dx}{\cos (x-a)\cos (x-b)}=}\]

If \[y=\frac{x}{2}\sqrt{{{a}^{2}}+{{x}^{2}}}+\frac{{{a}^{2}}}{2}\log (x+\sqrt{{{x}^{2}}+{{a}^{2}}})\],then \[\frac{dy}{dx}=\] [AISSE 1983]

\[\frac{d}{dx}{{\tan }^{-1}}\left[ \frac{\cos x-\sin x}{\cos x+\sin x} \right]=\] [AISSE 1985, 87; DSSE 1982,84; MNR 1985; Karnataka CET 2002; RPET 2002, 03]

If \[f(x)=\frac{{{\cos }^{2}}x+{{\sin }^{4}}x}{{{\sin }^{2}}x+{{\cos }^{4}}x}\] for \[x\in R\], then \[f(2002)=\] [EAMCET 2002]

The projection of any line on co-ordinate axes be respectively 3, 4, 5 then its length is [MP PET 1995; RPET 2001]

The direction cosines of a line segment \[AB\] are \[-2/\sqrt{17},\] \[3/\sqrt{17},\,\,-2/\sqrt{17}.\] If \[AB=\sqrt{17}\] and the co-ordinates of A are (3, -6, 10), then the co-ordinates of B are

Three forces of magnitudes 1, 2, 3 dynes meet in a point and act along diagonals of three adjacent faces of a cube. The resultant force is [MNR 1987]

The number of ways of dividing 52 cards amongst four players so that three players have 17 cards each and the fourth player just one card, is [IIT 1979]

Ten different letters of an alphabet are given. Words with five letters are formed from these given letters. Then the number of words which have at least one letter repeated is [IIT 1980; MNR 1998, 99; DCE 2001]

If \[^{56}{{P}_{r+6}}{{:}^{54}}{{P}_{r+3}}=30800:1\], then \[r=\] [Roorkee 1983; Kurukshetra CEE 1998]

There are four balls of different colours and four boxes of colours same as those of the balls. The number of ways in which the balls, one in each box, could be placed such that a ball does not go to box of its own colour is [IIT 1992]

A dictionary is printed consisting of 7 lettered words only that can be made with a letter of the word CRICKET. If the words are printed at the alphabetical order, as in an ordinary dictionary, then the number of word before the word CRICKET is [Orissa JEE 2003]

How many different nine-digit numbers can be formed from the digits of the number 223355888 by rearrangement of the digits so that the odd digits occupy even places [IIT Screening 2000; Karnataka CET 2002]

The number of positive integral solutions of \[a\,b\,c=30\]is [UPSEAT 2001]

For \[2\le r\le n,\left( \begin{matrix} n \\ r \\ \end{matrix} \right)+2\,\left( \begin{align} & \,\,n \\ & r-1 \\ \end{align} \right)\]\[+\left( \begin{matrix} n \\ r-2 \\ \end{matrix} \right)\] is equal to [IIT Screening 2000; Pb. CET 2000]

If \[x,\ y\] and \[r\] are positive integers, then \[^{x}{{C}_{r}}{{+}^{x}}{{C}_{r-1}}^{y}{{C}_{1}}{{+}^{x}}{{C}_{r-2}}^{y}{{C}_{2}}+.......{{+}^{y}}{{C}_{r}}=\] [Karnataka CET 1993; RPET 2001]

How many numbers between 5000 and 10,000 can be formed using the digits 1, 2, 3, 4, 5, 6, 7, 8, 9 each digit appearing not more than once in each number [Karnataka CET 1993]

12 persons are to be arranged to a round table. If two particular persons among them are not to be side by side, the total number of arrangements is [EAMCET 1994]

There are \[(n+1)\] white and \[(n+1)\] black balls each set numbered 1 to \[n+1\]. The number of ways in which the balls can be arranged in a row so that the adjacent balls are of different colours is [EAMCET 1991]

A car will hold 2 in the front seat and 1 in the rear seat. If among 6 persons 2 can drive, then the number of ways in which the car can be filled is

A library has \[a\] copies of one book, \[b\] copies of each of two books, \[c\] copies of each of three books and single copies of \[d\] books. The total number of ways in which these books can be distributed is

A father with 8 children takes them 3 at a time to the Zoological gardens, as often as he can without taking the same 3 children together more than once. The number of times each child will go to the garden is

There were two women participating in a chess tournament. Every participant played two games with the other participants. The number of games that the men played between themselves proved to exceed by 66 the number of games that the men played with the women. The number of participants is

The number of times the digit 5 will be written when listing the integers from 1 to 1000 is

There are 10 persons named \[A,\ B,.......J\]. We have the capacity to accommodate only 5. In how many ways can we arrange them in a line if \[A\] is must and \[G\] and \[H\] must not be included in the team of 5

How many words can be made from the letters of the word BHARAT in which B and H never come together [IIT 1977]

In how many ways can a committee be formed of 5 members from 6 men and 4 women if the committee has at least one woman [RPET 1987; IIT 1968; Pb. CET 2003]

Five balls of different colours are to be placed in three boxes of different sizes. Each box can hold all five balls. In how many ways can we place the balls so that no box remains empty [IIT 1981]

The number of times the digit 3 will be written when listing the integers from 1 to 1000 is

In a certain test there are \[n\] questions. In the test \[{{2}^{n-i}}\] students gave wrong answers to at least \[i\] questions, where \[i=1,\ 2,\ ......n\]. If the total number of wrong answers given is 2047, then \[n\] is equal to

A five digit number divisible by 3 has to formed using the numerals 0, 1, 2, 3, 4 and 5 without repetition. The total number of ways in which this can be done is [IIT 1989; AIEEE 2002]

\[m\] men and n women are to be seated in a row so that no two women sit together. If \[m>n\], then the number of ways in which they can be seated is [IIT 1983]

A box contains two white balls, three black balls and four red balls. In how many ways can three balls be drawn from the box if at least one black ball is to be included in the draw [IIT 1986; DCE 1994]

The number of ways in which the letters of the word ARRANGE can be arranged such that both R do not come together is [MP PET 1993]

The value of \[{{2}^{n}}\,\{1.3.5.....(2n-3)\,(2n-1)\}\] is

Function \[f(x)=\frac{1-\cos 4x}{8{{x}^{2}}},\] where \[x\ne 0\]and \[f(x)=k\] where \[x=0\] is a continous function at \[x=0\]then the value of k will be [AMU 2005]

If \[f(x)=\left\{ \begin{align} & \,\,\,\,\,\,\,{{e}^{x}};\,\,\,\,x\le 0 \\ & |1-x|;\,\,x>0 \\ \end{align} \right.\], then [Roorkee 1995]

If \[f(x)=\left\{ \begin{align} & ({{x}^{2}}/a)-a,\ \ \text{when}\ xa \\ \end{align} \right.\] then

If \[f(x)=\]\[\left\{ \begin{align} & \frac{1-(x)}{1+x},\,\,\,\,\,x\ne -1 \\ & \,\,1\,\,\,\,\,\,\,\,\,,\,\,\,\,\,x=-1 \\ \end{align} \right.\], then the value of \[f(|2k|)\]will be (where [ ] shows the greatest integer function) [DCE 2005]

The function \[f(x)=\frac{2{{x}^{2}}+7}{{{x}^{3}}+3{{x}^{2}}-x-3}\]is discontinuous for [J&K 2005]

The value of f at \[x=0\] so that the function \[f(x)=\frac{{{2}^{x}}-{{2}^{-x}}}{x},x\ne 0\], is continuous at \[x=0\], is [Kerala (Engg.) 2005]

In the function \[f(x)=\frac{2x-{{\sin }^{-1}}x}{2x+{{\tan }^{-1}}x},\ (x\ne 0)\]is continuous at each point of its domain, then the value of \[f(0)\] is [RPET 2000]

The function \[f(x)=|x|+\frac{|x|}{x}\] is [Karnataka CET 2003]

For the function \[f(x)=\left\{ \begin{align} & \frac{{{e}^{1/x}}-1}{{{e}^{1/x}}+1},\,\,x\ne 0 \\ & 0\,\,\,\,\,\,\,\,\,\,\,\,\,\,\,\,,\,\,x=0 \\ \end{align} \right.\], which of the following is correct [MP PET 2004]

A function f on R into itself is continuous at a point a in R, iff for each \[\in >0\], there exists, \[\delta >0\]such that [UPSEAT 2004]