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This section includes 7 InterviewSolutions, each offering curated multiple-choice questions to sharpen your Current Affairs knowledge and support exam preparation. Choose a topic below to get started.
| 1. |
What per cent is612 people of 720 people |
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| 2. |
ABCD is a quadrilateral. The diagonal AC bisects the diagonal BD at E. Prove that AABC andAADC are equal in area. |
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Answer» thanks |
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| 3. |
,In ΔΑΒΟ, if AD is the median, show that AB + AC2-2 (AD2 + BD2) |
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Answer» Like if you find it useful |
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| 4. |
In the adjoining figure, the point D divides theside BC of AABC in the ratio m:n. Prove that4.ar(AABD): ar(AADC)m:n. |
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| 5. |
In the given figure, BC is a common and AB= AC, ABC=BCD then prove thatAC-=AD |
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| 6. |
25' 10dd the following78710 5 2 |
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| 7. |
Find the value of k for the following system of equation have infinite solution6x + (2x-1)y2k + 5 |
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| 8. |
In ΔΑΒ. if AD is the median, then show that AB-AC2-2(AD2-BD2) |
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| 9. |
In ÎABC, if AD is the median, then show that AB2+AC2-2(AD2-Bd') |
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Answer» thank you |
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| 10. |
I. Determinee whether the solution-set is finite or infinite or empty:(i) r < 1000. r e N |
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Answer» Given : x < 1000 and x belongs to N So, solution set S is S = { 1, 2, 3, 4, 5 ...... 999} This is finite set |
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| 11. |
In AABC, if AD is the median, then show that AB+AC2 2(AD2+BD2) |
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Answer» construction :- draw a line AM perpendicular to BC. we have to prove : AB² + AC² = 2(AD² + BD²) proof :- case 1 :- when , it means AD is perpendicular on BC and both angles are right angle e.g., 90° then, from ∆ADB, according to Pythagoras theorem, AB² = AD² + BD² ..... (1) from ∆ADC ,according to Pythagoras theorem, AC² = AD² + DC² ...... (2) AD is median. so, BD = DC .......(3) from equations (1) , (2) and (3), AB² + AC² = AD² + AD² + BD² + BD² AB² + AC² = 2(AD² + BD²) [hence proved ] case 2 :- when Let us consider that, ADB is an obtuse angle. from ∆ABM, from Pythagoras theorem, AB² = AM² + BM² AB² = AM² + (BD + DM)² AB² = AM² + BD² + DM² + 2BD.DM ......(1) from ∆ACM, according to Pythagoras theorem, AC² = AM² + CM² AC² = AM² + (DC - DM)² AC² = AM² + DC² + DM² - 2DC.DM ......(2) from equations (1) and (2), AB² + AC² = 2AM² + BD² + DC² + 2DM² + 2BD.DM - 2DC.DM AB² + AC² = 2(AM² + DM²) + BD² + DC² + 2(BD.DM - DC.DM) ...........(3) a/c to question, AD is median on BC.so, BD = DC .....(4)and from ADM, according to Pythagoras theorem, AD² = AM² + DM² ........(5) putting equation (4) and equation (5) in equation (3), AB² + AC² = 2AD² + 2BD² + 2(BD.DM - BD.DM) AB² + AC² = 2(AD² + BD²) [hence proved]. |
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| 12. |
In AABC, if AD is the median, then show that AB2+AC2 2(AD2+BD2) |
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Answer» construction :- draw a line AM perpendicular to BC. we have to prove : AB² + AC² = 2(AD² + BD²) proof :- case 1 :- when , it means AD is perpendicular on BC and both angles are right angle e.g., 90° then, from ∆ADB, according to Pythagoras theorem, AB² = AD² + BD² ..... (1) from ∆ADC ,according to Pythagoras theorem, AC² = AD² + DC² ...... (2) AD is median. so, BD = DC .......(3) from equations (1) , (2) and (3), AB² + AC² = AD² + AD² + BD² + BD² AB² + AC² = 2(AD² + BD²) [hence proved ] case 2 :- when Let us consider that, ADB is an obtuse angle. from ∆ABM, from Pythagoras theorem, AB² = AM² + BM² AB² = AM² + (BD + DM)² AB² = AM² + BD² + DM² + 2BD.DM ......(1) from ∆ACM, according to Pythagoras theorem, AC² = AM² + CM² AC² = AM² + (DC - DM)² AC² = AM² + DC² + DM² - 2DC.DM ......(2) from equations (1) and (2), AB² + AC² = 2AM² + BD² + DC² + 2DM² + 2BD.DM - 2DC.DM AB² + AC² = 2(AM² + DM²) + BD² + DC² + 2(BD.DM - DC.DM) ...........(3) a/c to question, AD is median on BC.so, BD = DC .....(4)and from ADM, according to Pythagoras theorem, AD² = AM² + DM² ........(5) putting equation (4) and equation (5) in equation (3), AB² + AC² = 2AD² + 2BD² + 2(BD.DM - BD.DM) AB² + AC² = 2(AD² + BD²) [hence proved]. |
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| 13. |
1. In the figure 10.9, lll m ll n and p is a transversal. If A = 110°, find angles x, y, z,and wW.pn110°ラ> mrnFig. 10.9 |
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Answer» x = 180° -110° = 70°y = 70° ( vertically opposite angle)z = 70° (corresponding angle)w = 180-70 = 110° ( linear pair) |
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| 14. |
thePolyno rYLaln 3-6x-1rngivenven, polynomlal 612Find PC) |
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Answer» To find P(1) put value of x as 1. (1)^3 -6(1)^2 -11(1)-6=1-6-11-6=1-23 =-22. |
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| 15. |
22 / ( 11 x 10 ^ - 19) |
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Answer» 2000000000= 2×10^19 is the answer |
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| 16. |
For which value of K, (2, 2) is a solutionof the equation x +2y-K-0? |
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Answer» Put in (2,2) in the equation as it is a solution2+2(2)-k=02+4-k=0k=6 |
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| 17. |
admiring sums in maths |
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Answer» Ans :- When these numbers are added together (represented by the "+" sign), the resulting answer is called the "sum." When a number is subtracted from another number (represented by the "-" sign), the result is known as the "difference." |
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| 18. |
7. Do these sums(a) 23+ 36+ 74 |
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Answer» 59 And 79 is the ans of this sums |
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| 19. |
Q3- Find the value of k show that the following system of question has infinitesolution?3x-y-5-0,6x-2y+k o |
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| 20. |
Solve the following : A circle touches all the four sides of quadABCD. ProveIf the cloth is AB+CD =AD+BC |
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| 21. |
Show that exactly one of the numbers n, n + 2 or n + 4 is divisible by 3. |
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Answer» let n be any positive integer and b=3n =3q+rwhere q is the quotient and r is the remainder0_ <r<3so the remainders may be 0,1 and 2so n may be in the form of 3q, 3q=1,3q+2 CASE-1 IF N=3qn+4=3q+4n+2=3q+2here n is only divisible by 3 CASE 2if n = 3q+1n+4=3q+5n+2=3q=3here only n+2 is divisible by 3 CASE 3IF n=3q+2n+2=3q+4n+4=3q+2+4=3q+6here only n+4 is divisible by 3 HENCE IT IS JUSTIFIED THAT ONE AND ONLY ONE AMONG n,n+2,n+4 IS DIVISIBLE BY 3 IN EACH CASE |
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| 22. |
2x-128 |
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Answer» 2x-128= 02x = 128x = 128/2x = 64 |
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| 23. |
If the mid-point of the line joining (3, 4 ) and (13, 7 ) is (x, y) and2x+ 2y+k11.0, find the value of k. |
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| 24. |
Show that any one of the numbers (n+2), n and (n + 4) is divisible by 3 |
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Answer» Solution: let n be any positive integer and b=3n =3q+rwhere q is the quotient and r is the remainder0_ <r<3so the remainders may be 0,1 and 2so n may be in the form of 3q, 3q=1,3q+2 CASE-1 IF N=3qn+4=3q+4n+2=3q+2here n is only divisible by 3 CASE 2if n = 3q+1n+4=3q+5n+2=3q=3here only n+2 is divisible by 3 CASE 3IF n=3q+2n+2=3q+4n+4=3q+2+4=3q+6here only n+4 is divisible by 3 HENCE IT IS JUSTIFIED THAT ONE AND ONLY ONE AMONG n,n+2,n+4 IS DIVISIBLE BY 3 IN EACH CASE |
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| 25. |
18.A quadrilateral ABCD is drawn to circumscribe a circle. Prove that: AB + CD = AD + BC |
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| 26. |
9. A quadrilateral ABCD is drawn to circumscribe a circle (see Fig. 10.17). Show thatAB + CD AD BC |
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| 27. |
07 2.031-V) = 501) 2 (0+32) = 50v.salvez |
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Answer» 4259+634*258*#6/786344 2(3u-v)=5uv; 2(u+3v)=5uv. 6u-2v=5 uv; 2u+6uv=5uv. 3(2u+6uv=5uv)=6u+18uv=15uv; 6u+18uv=15uv; 6u-2v=15vu/18uv+2v=0; 2v(9u+1) |
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| 28. |
हि 5600 =v2 tang न? ] .. 207 )3 OF1 . cosec’ ©-sec’ 8 e |
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Answer» Please hit the like button if this helped you |
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| 29. |
2.ली ती CG-|रे " G३ टूर 541ल) (1) ले २01) 1दिवा' » १ , है { 07, 2 |
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| 30. |
0, 2. Find the sums givenb(07+ 107 + 14+84 |
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Answer» a= 7d= 21/2-7= 7/2last term = 84 |
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| 31. |
07 ला 2894 ००१ एक § o 2" वL v oo cOw 14 |
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Answer» let x be the common ratiothenx+3x=1804x=180x=453x=3x45=135angles are ,45,45,135,135 |
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| 32. |
A quadrilateral ABCD is drawn to circumscribe a circle (as shown in figure). Prove thatAB CD AD BC.18. |
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| 33. |
In an examination,70% of the candidates passed in english,65% in mathematics,26% failed in both subjects and 248 passed in both subjects.Find the total number of candidates. |
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Answer» If there are 100 candidates, thencandidates failed in english =30candidates failed in Maths = 35candidates failed in both = 27candidates failed in atleast one subject = 30+35-27 = 38candidates passed in both subjects = 62If 62 candidates passed in both subjects, then total candidates = 100If 248 candidates passed in both subjects, then total candidates = 100*248/62=400 |
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| 34. |
Find the equation of the circle havingCentre at (1, 3) & radius- 3 |
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| 35. |
ŕ¤ŕ¤ż 21. 2a+ 3 =K: ; 3a - 4 = - 5 |
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Answer» Multiplying eq 1 by 3 and eq 2 by 2, we get 6a+9b = 246a-8b = -10 solving we get, 17b = 34 b = 2 Substituting b= 2, in eq 1 2a + 3(2) = 8 2a = 8-6 a = 2/2 a= 1 |
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| 36. |
Show that in a quadrilateral ABCD, AB+ BC+ CD + AD> AC+BD |
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Answer» that's another question |
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| 37. |
hink Discuss and write:Is every rectangle a parallelogram? Is every parallelogram a rectangle? |
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Answer» Every rectangle has 2 sets of parallel lines so it is parallelogram. But a parallelogram does not necessarily have sides at right angles so every parallelogram is not a rectangle |
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| 38. |
Using opposite angles test for parallelogram , prove that every rectangle is a parallelogram. |
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Answer» we can easily prove that ABM ≡ CDM using the SAS congruence test. (alternate angles are equal). Hence, ABCD is a parallelogram, because one pair of opposite sides are equal and parallel. Thereafter, ABCD is also a rectangle, because it is a parallelogram with one right angle it's not right because one pair is also parallel in trapezium |
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| 39. |
6. Show that the following points form a equilateraltriangle A(a,0), B(-a, 0), C(0, a 13) |
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| 40. |
18. Find the values of a and b for which the following system of linear equations has infinitely manysolutions(0) 2x + 3y 7 (a+b+1) + (a 2b+ 2)y 4la+ b)+1(a) 2x+3y-7, (a+ b)x (2a - b)y 3a+ b+ 1)Soluti |
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| 41. |
The diameter of Venus planet is 12278 km. Find its circumference. (Ď = 22 |
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Answer» Radius = Diameter/ 2 = 12278/2 = 6139 km Circumference of the circle = 2πr= 2*22/7*6139= 38552.92 km Hence, circumference of the circle is 38552.92 km |
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| 42. |
1285 i< ol डाWidh side i cCm = Teyn séuapd — 88 °t, 07 — s ChlGiads Jhe O eqotane shade dEnEgiah comen |
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| 43. |
5+7+2+-07-8 |
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Answer» -1 is the right answer |
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| 44. |
Cu0 + 50,$07 5 cuo*Cus8'+ # |
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Answer» 3 Cu2S + 8 SO4{-}2 + 8 H{+} = 6 CuO + 11 SO2 + 4 H2O |
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| 45. |
Draw a circle of radius 3.6 cm. In the circle, draw a chord AB = 5 cm. Now shade theminor segment of the circle. |
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Answer» 👍 👍 |
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| 46. |
on,84%ofthecandidatespassedand 780 failed. Find the number of candidatamination. |
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Answer» 84% passed so 16% failed16% = 780so total students=(780×100)/16=4875 |
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| 47. |
16. Find the values of(1) sin 150°(2) cos 120°(3) tan 135°(4) cos 780°(5) sec 210°(6) cot 330° |
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| 48. |
(a)C.P=70, S.P=780 |
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| 49. |
\operatorname { sin } 780 ^ { \circ } \operatorname { sin } 480 ^ { \circ } + \operatorname { cos } 240 ^ { \circ } \operatorname { cos } 300 ^ { \circ } = \frac { 1 } { 2 } |
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Answer» sin780. sin480 + cos120.sin150=sin(8 x 90+60).sin(5 x90+30) + cos(2 x90 -60).sin(2 x90 +30)=sin60.cos30 + cos60.(-sin30)=sin60.cos30 - cos60.sin30=sin(60 -30)=sin30=1/2 |
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| 50. |
| Two: Anges of a quadrilateral are 780 5and 12200he other tree angles areTequal. Find the messuie de these twoAnglese |
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Answer» find zero of following question polynomial and verify the relationship between the zeros and their coefficient |
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