<html><table height="500" width="1000" border="2"><TR height="5" width="1000"><strong><center><marquee><font color="Green"><h1>APTITUDE</h1></center></strong></font></TR></marquee><TR><TD align="left" width="200" valign="top"><table><TR><a href="numbers.html"><strong>Numbers</strong></a></TR><br><TR><a href="hcf.html"><strong>H.C.F and L.C.M</strong></a></TR><br><TR><a href="dec.html" target="right"><strong>Decimal Fractions</strong></a></TR><br><TR><a href="simplification.html"><strong>Simplification</strong></a></TR><br><TR><a href="squareandcuberoot.html" target="right"><strong>Square and Cube roots</strong></a></TR><br><TR><a href="average.html" ><strong>Average</strong></a></TR><br><TR><a href="pnumbers.html" ><strong>Problems on Numbers</strong></a></TR><br><TR><a href="problemsonages.html"><strong>Problems on Ages</strong></a></TR><br><TR><a href="surdsandindices.html"><strong>Surds and Indices</strong></a></TR><br><TR><a href="percent.html" target="right"><strong>Percentage</strong></a></TR><br><TR><a href="profitandloss.html" target="right"><strong>Profit and Loss</strong></a></TR><br><TR><a href="ratioandproportion.html" target="right"><strong>Ratio And Proportions</strong></a></TR><br><TR><a href="partnership.html"><strong>Partnership</strong></a></TR><br><TR><a href="chainrule1.html"><strong>Chain Rule</strong></a></TR><br><TR><a href="timeandwork.html" target="right"><strong>Time and Work</strong></a></TR><br><TR><a href="pipesandcisterns.html" target="right"><strong>Pipes and Cisterns</strong></a></TR><br><TR><a href="timeanddistance.html"><strong>Time and Distance</strong></a></TR><br><TR><a href="trains.html" target="right"><strong>Trains</strong></a></TR><br><TR><a href="boats.html"><strong>Boats and Streams</strong></a></TR><br><TR><a href="alligation.html"><strong>Alligation or Mixture </strong></a></TR><br><TR><a href="simple.html" target="right"><strong>Simple Interest</strong></a></TR><br><TR><a href="CI.html" target="right"><strong>Compound Interest</strong></a></TR><br><TR><a href=""><strong>Logorithms</strong></a></TR><br><TR><a href="areas.html" target="right"><strong>Areas</strong></a></TR><br><TR><a href="volume.html" target="right"><strong>Volume and Surface area</strong></a></TR><br><TR><a href="races.html" target="right"><strong>Races and Games of Skill</strong></a></TR><br><TR><a href="calendar.html" target="right"><strong>Calendar</strong></a></TR><br><TR><a href="clocks.html" target="right"><strong>Clocks</strong></a></TR><br><TR><a href="" target="right"><strong>Stocks ans Shares</strong></a></TR><br><TR><a href="true.html" target="right"><strong>True Discount</strong></a></TR><br><TR><a href="banker1.html" target="right"><strong>Bankers Discount</strong></a></TR><br><TR><a href="oddseries.html" target="right"><strong>Oddmanout and Series</strong></a></TR><br><TR><a href=""><strong>Data Interpretation</strong></a></TR><br><TR><a href="probability.html"><strong>probability</strong></a></TR><br><TR><a href="percom1.html" target="right" ><strong>Permutations and Combinations</strong></a></TR><br><TR><a href="pinkivijji_puzzles.html" target="right"><strong>Puzzles</strong></a></TR></table></TD><TD valign="top"><a href="pnumbers.html"  name="right"><b>BACK</b></a><font size="5"><center><b>PROBLEMS ON NUMBERS</b></center></font><br><br> <font size="5"><b>SOLVED PROBLEMS</b></font><br><br><br><br>   <font size="4">      <b>Complex Problems</b>:<br><br>24.Six bells commence tolling together and toll at intervals <br>of 2,4,6,8,10,12 seconds respectively. In 30 minutes how many <br>times do they toll together?  <br>    Solution:<br>To find the time that the bells will toll together we have<br> to take L.C.M  of 2,4,6,8,10,12 is 120.<br><br>So,the bells will toll together after every 120 seconds<br> i e, 2 minutes<br><br>In 30 minutes they will toll together  [30/2 +1]=16 times<br><br>25.The sum of two numbers is 15 and their geometric mean is <br>20% lower than their arithmetic mean. Find the  numbers?<br><br>a.11,4   &nbsp;&nbsp;  b.12,3   &nbsp;&nbsp;  c.13,2  &nbsp;&nbsp;   d.10,5   <br><br>Solution:<br><pre>Sum of the two numbers is a+b=15.<br>their A.M = a+b / 2 and G.M = (ab)<sup>1/2</sup><br>Given G.M = 20% lower than A.M<br>                    =80/100 A.M<br>              (ab)<sup>1/2</sup>=4/5  a+b/2 = 2*15/5= 6<br>                 (ab)<sup>1/2</sup>=6<br>                  ab=36 =>b=36/a<br>                 a+b=15<br>                 a+36/a=15<br>                 a2+36=15a<br>                 a2-15a+36=0<br>                 a2-3a-12a+36=0<br>                 a(a-3)-12(a-3)=0<br>                 a=12 or 3.<br></pre>If a=3   and a+b=15 then b=12.<br>If a=12 and a+b=15 then b=3. <br><br>Ans (b).<br><br><br>26.When we multiply a certain two digit number by the<br> sum of its digits 405 is achieved. If we multiply the<br> number written in reverse order of the same digits <br>by the sum of the digits,we get 486.Find the number?<br><br>a.81    &nbsp;&nbsp; b.45    &nbsp;&nbsp;c.36   &nbsp;&nbsp;d. none<br><br>Solution:<br>Let the number be x y.<br><br>When we multiply the number by the sum of its digit <br>405 is achieved.<br><br>                    (10x+y)(x+y)=405....................1<br><br>If we multiply the number written in reverse order by its<br> sum of digits we get 486.<br>                 (10y+x)(x+y)=486......................2<br><br>dividing 1 and 2<br>   (10x+y)(x+y)/(10y+x)(x+y)  =  405/486.<br>   10x+y / 10y+x  = 5/6.<br>                 60x+6y = 50y+5x<br>                 55x=44y<br>                 5x = 4y.<br>   From the above condition we conclude that the above <br>condition is satisfied by the second option i e b. 45.<br><br>Ans (b).<br><br><br>27.Find the HCF and LCM of the polynomials x2-5x+6 and x2-7x+10?<br>a.(x-2),(x-2)(x-3)(x-5)<br>b.(x-2),(x-2)(x-3)<br>c.(x-3),(x-2)(x-3)(x-5)<br>d. none<br>Solution:<br>The given polynomials are <br>                 x2-5x+6=0................1 <br>                x2-7x+10=0...............2<br>we have to find the factors of the polynomials<br><pre>  x2-5x+6           and                  x2-7x+10 x2-2x-3x+6                            x2-5x-2x+10     x(x-2)-3(x-2)                        x(x-5)-2(x-5) (x-3)(x-2)                             (x-2)(x-5)</pre><br>From the above factors of the polynomials we can easily<br> find the HCF as (x-3)and LCM as (x-2)(x-3)(x-5).<br><br>Ans (c)<br><br>28.The sum of  all possible two digit numbers formed from <br>three different one digit natural numbers when divided by <br>the sum of the original three numbers is equal to?<br><br>a.18    &nbsp;&nbsp;b.22  &nbsp;&nbsp; c.36   &nbsp;&nbsp; d. none<br><br>Solution:<br>Let the one digit numbers x,y,z<br>Sum of all possible two digit numbers<br>=(10x+y)+(10x+z)+(10y+x)+(10y+z)+(10z+x)+(10z+y)  = 22(x+y+z)<br>Therefore sum of all possible two digit numbers when <br>divided by sum of one digit numbers gives 22.<br><br><br>29.A number being successively divided by 3,5,8 leaves<br> remainders 1,4,7 respectively. Find the respective<br> remainders if the order of divisors are reversed?<br><br>Solution:<br>Let the number be x.<br><pre>                               3    -  x                       5      y    -  1                       8      z    -   4                               1    -  7  </pre><br>z=8*1+7=15<br>y=5z+4 = 5*15+4 = 79<br>x=3y+1 = 3*79+1=238<br><pre>Now              8      238                       5      29   -  6                       3      5    -   4                               1    -  2</pre><br>Respective remainders are 6,4,2.<br><br><br>30.The arithmetic mean of two numbers is smaller by 24<br> than the larger of the      two numbers and the GM of <br>the same numbers exceeds by 12 the smaller of the numbers.<br> Find the numbers?<br><br>a.6,54     &nbsp;&nbsp; b.8,56   &nbsp;&nbsp; c.12,60   &nbsp;&nbsp; d.7,55<br>Solution:<br>Let the numbers be a,b where a is smaller and b <br>is larger number.<br>The AM of two numbers is smaller by 24 than the<br> larger of the two numbers.<br>                            AM=b-24<br><br>AM of two numbers is a+b/2.<br>                           a+b/2  =  b-24<br>                           a+b = 2b-48<br>                           a = b-48...................1<br>The GM of the two numbers exceeds by 12 the smaller<br> of the numbers<br><br>                         GM = a+12<br>