- Page 1 and 2: ek/;fed f'k{kk e.My] e/;izns'k]Hkks
- Page 3 and 4: (a) Aryabhatt (b) Varachmihir(c) Br
- Page 5 and 6: 13- czãxqIr us dkSu&lh jpuk dh gS&
- Page 7 and 8: 22- HkkLdjkpk;Z dh jpukvksa dk vuqo
- Page 9 and 10: y?kq mÙkjh; ,oa nh?kZ mÙkjh; iz'u
- Page 11 and 12: v/;k;&2Unit-2leqPp;] la[;k i)fr ,oa
- Page 13 and 14: 8- leqPp;ksa vkSj muds xq.k/keksZa
- Page 15 and 16: The sum of Two sets are 30.(a) 5 (b
- Page 17 and 18: v/;k;&2Unit-2leqPp;] la[;k i)fr ,oa
- Page 19 and 20: 9- ;fn A vkSj B nks ,sls leqPp; gks
- Page 21 and 22: T ds 11T has 11∪∩n A( ∪∩A
- Page 23 and 24: 27. ,d lfefr esa 50 O;fDr ÝSap] 20
- Page 25 and 26: 4- _.k la[;kvksa] 'kwU; vkSj izkd`r
- Page 27 and 28: 11- ,slh dj.kh dks] ftldk ,d xq.kku
- Page 29 and 30: y?kq mRrjh; izdkj ds iz'uShort answ
- Page 31: (iv) 2√6-√5 (vi) 7√3-5√23
- Page 37 and 38: v/;k;&3Unit-3Qyu(Function)oLrqfu"B
- Page 39 and 40: If 'R' lies on 'O' then X-coordinat
- Page 41 and 42: In rectangular coordinate system, t
- Page 43 and 44: dkbZ & 3 (Unit-3)Qyu (Function)y?kq
- Page 45 and 46: 6- fuEufyf[kr fcUnqvksa dk ledksf.k
- Page 47 and 48: v/;k;&4Unit-4cgqin ,oa 'ks"kQy izes
- Page 49 and 50: 7- x 3 - x vkSj t 2 + t fdl cgqin d
- Page 51 and 52: The product of polynomials is obtai
- Page 53 and 54: (c)A polynomial =Both are true dksb
- Page 55 and 56: dkbZ 4@ Unit-4cgqin ,oa 'ks"k igy i
- Page 57 and 58: 6. xq.ku[k.M djks (Factorize)(a) x
- Page 59 and 60: (c) 2x 2 - 5 x + 1 (d) x 2 + 12 x +
- Page 61 and 62: 16 fuEufyf[kr O;atdksa dk egRre lek
- Page 63 and 64: 22 fuEufyf[kr cgqinksa dks js[kh;]f
- Page 65 and 66: 28- p(u)+q(u) rFkk p(u) - q(u) Kkr
- Page 67 and 68: 35 cgqin 5x(x 2 +x+1) - (4x+4x 4 )
- Page 69 and 70: If on dividing f(x) = x 4 -2x 3 +3x
- Page 71 and 72: 59- p(x) = x 4 -3x 2 +2x+1 dks x-1
- Page 73 and 74: v/;k;&5Unit-5y?kqx.kd(Logarithms)oL
- Page 75 and 76: 6- nks la[;kvksa ds xq.kuQy dk y?kq
- Page 77 and 78: 14. log dk eku gS AThe value of log
- Page 79 and 80: 23. (log x27+log 832) dk eku gksxk
- Page 81 and 82: ( I)FHG−1 −1 −1( II)x y y z x
- Page 83 and 84:
9- fuEufyf[kr dks y?kqx.kd ds :i es
- Page 85 and 86:
16- fl) dhft, fd4 log - 16 logProve
- Page 87 and 88:
(iii) 300 (vi) 0.0003258Write logar
- Page 89 and 90:
(iv)(ix) (0.09634) 3(v)x 2.143 x (1
- Page 91 and 92:
v/;k;&6Unit-6,d pj jkf'k dk ,d ?kkr
- Page 93 and 94:
(a)(c) 2 3 − 2what is the value o
- Page 95 and 96:
Solve the following equations:( i)(
- Page 97 and 98:
The angle A of a triangle ABC is eq
- Page 99 and 100:
The difference between two numbers
- Page 101 and 102:
28- nks vadksa okyh ,d la[;k ds vad
- Page 103 and 104:
35- ,d vk;rkdkj {ks= dh yEckbZ mldh
- Page 105 and 106:
43- fdlh dk;Z dks fguk vkSj lhek 8
- Page 107 and 108:
4.(a) cosecA (b) secA(c) cosA(d) No
- Page 109 and 110:
(c)(d)15. ;fn A=45 0 rks gy gksxk 2
- Page 111 and 112:
Ina right triangle c is right angle
- Page 113 and 114:
Find the remaining parts of the tri
- Page 115 and 116:
] vkSj1tan A = rks3fn[kkb, fd sinAc
- Page 117 and 118:
(ii) cos (A + B) = cosA cosB - sinA
- Page 119 and 120:
60- ,d [kEck 12 eh- Åapk gS] [kEcs
- Page 121 and 122:
68- ,d 100 ehVj Åaph ehukj dh pksV
- Page 123 and 124:
76. Hkwfe ij fcanq P ls ] ,d ehukj
- Page 125 and 126:
A shopkeeper sold an article for Rs
- Page 127 and 128:
11- ,d O;fDr us 320 vke dks 400 vke
- Page 129 and 130:
19- fdrus o"kZ esa ewy?ku nwxuk gks
- Page 131 and 132:
27- nks o"kZ dh pØo`f) C;kt ls feJ
- Page 133 and 134:
4. uQhl us dEI;wVj ra= 40]000 :- es
- Page 135 and 136:
13. nkeksnj us 30]000 :i, esa nks H
- Page 137 and 138:
20. ,d O;kikjh mlds LVksj ls Ø; dh
- Page 139 and 140:
27. xzkgd ds fy, vf/kd vuqdwy D;k g
- Page 141 and 142:
35. fdl jkf'k ij 2 o"kZ dk lk/kkj.k
- Page 143 and 144:
45. A vkSj B us Øe'k% 6000 #- vkSj
- Page 145 and 146:
49. foDdh dh iklcqd dk ,d i`"V fuEu
- Page 147 and 148:
Alka closes the account finally on
- Page 149 and 150:
55. fQfyi cSad esa 219 fnu ds fy, 4
- Page 151 and 152:
62- ,d xk; 4800 :i, esa [kjhn dj 54
- Page 153 and 154:
A merchant bought 17 quintal potato
- Page 155 and 156:
1112 7 %jkts'k dks csp fn;kA ;fn jk
- Page 157 and 158:
In following questions 1 to 5, fill
- Page 159 and 160:
95- fdrus izfr'kr pØo`f) C;kt dh n
- Page 161 and 162:
v/;k;&9&10Unit-9-10T;fefrGEMOTRYoLr
- Page 163 and 164:
In a triangle side opposite to grea
- Page 165 and 166:
17. ∆ ABC esaA=100 0 vkSj AB = AC
- Page 167 and 168:
dkbZ Unit - 9 - 10T;kferh Gemotryy?
- Page 169 and 170:
In Fig. 8.19, PQRS is a quadrilater
- Page 171 and 172:
In Fig.8.41, ABC and DBC are two tr
- Page 173 and 174:
fl) dhft, fd CD = CE¼ ladsr % C ls
- Page 175 and 176:
v/;k;&9Unit-9f=Hkqtksa dh lokZaxler
- Page 177 and 178:
BCesa AD mldh ,d ef/;dk gSA fl) dhf
- Page 179 and 180:
∠P∠ABC∆SQRSN SM∆ABC⊥PQPRd
- Page 181 and 182:
dh Hkqtk BC esa og fcUnq fdl izdkj
- Page 183 and 184:
(c)(d)fod.kZ ,d&nwljs dks lef}Hkkft
- Page 185 and 186:
v/;k;&10Unit-10lekarj prqHkqZt(Para
- Page 187 and 188:
12- fdlh leprqHkqZt ds fod.kZ ijLij
- Page 189 and 190:
23- ;fn D, E vkSj F Øe'k%dh Hkqtkv
- Page 191 and 192:
v/;k;&11Unit-11T;kferh; jpuk,a(Geom
- Page 193 and 194:
dkbZ & 11Unit-11T;kferh; jpuk,a(Geo
- Page 195 and 196:
Construct a trapezium ABCD when AB
- Page 197 and 198:
22 ,d leyEc prqHkqZt ABCD dh jpuk d
- Page 199 and 200:
36 ,d prqHkqZt ABCD dh jpuk dhft, f
- Page 201 and 202:
v/;k;&12Unit-12lkaf[;dh(Statistics)
- Page 203 and 204:
5- fdlh 'kkyk ds Nk= }kjkvius ,d fn
- Page 205 and 206:
8- fuEufyf[kr vko`fRr lkfj.kh ds vk
- Page 207 and 208:
oxZvko`fRrClassFrequency10-20 320-3
- Page 209 and 210:
17- fuEufyf[kr dh ifjHkk"kk nhft,A
- Page 211:
27 fuEufyf[kr vkadM+ksa ds fy;s ,d