Question
The energy dissipated in a damped oscillation,
- decays exponentially
- decay curve will depend on the drag constant
- decays linearly
- decays following a sine curve with diminishing amplitude
The correct answer is: decays exponentially
Related Questions to study
If the time period of undamped oscillation is T and that of damped oscillatin is , then T,what is the relation between I&.
If the time period of undamped oscillation is T and that of damped oscillatin is , then T,what is the relation between I&.
Four lowest energy levels of
-atom are shown in the figure. The number of possible emission lines would be
![](data:image/png;base64,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)
Four lowest energy levels of
-atom are shown in the figure. The number of possible emission lines would be
![](data:image/png;base64,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)
Complete the following sentence In a damped oscillation of a pendulum ..
Complete the following sentence In a damped oscillation of a pendulum ..
When a sample of solid lithium is placed in a flask of hydrogen gas then following reaction happened
This statement is
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/484716/1/882560/Picture1.png)
When a sample of solid lithium is placed in a flask of hydrogen gas then following reaction happened
This statement is
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/484716/1/882560/Picture1.png)
complete the following sentence.Time period of oscillating of a simple pendulum is dependent on...
complete the following sentence.Time period of oscillating of a simple pendulum is dependent on...
Let the eleven letters .....,K denote an arbitrary permutation of the integers (1, 2,.....11), then ![left parenthesis A minus 1 right parenthesis left parenthesis B minus 2 right parenthesis left parenthesis C minus 3 right parenthesis horizontal ellipsis. left parenthesis K minus 11 right parenthesis](data:image/png;base64,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)
Let the eleven letters .....,K denote an arbitrary permutation of the integers (1, 2,.....11), then ![left parenthesis A minus 1 right parenthesis left parenthesis B minus 2 right parenthesis left parenthesis C minus 3 right parenthesis horizontal ellipsis. left parenthesis K minus 11 right parenthesis](data:image/png;base64,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)
The following diagram indicates the energy levels of a certain atom when the system moves from
level to
, emitting a photon of wavelength
. The wavelength of photon produced during its transition from
level to
is
![](data:image/png;base64,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)
The following diagram indicates the energy levels of a certain atom when the system moves from
level to
, emitting a photon of wavelength
. The wavelength of photon produced during its transition from
level to
is
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)
pitch of screw gauge is 1 mm and there are 100 divisions on the circular scak. What measurin the diametcr of a wire, the linear scale reads, 1 mm and 47t division on the circular scale coincide with the reference line. The lengthof the wire 155.6 cm. What will be the curved surface area (in cm2 of the wire in appropriate number of significant figures.
pitch of screw gauge is 1 mm and there are 100 divisions on the circular scak. What measurin the diametcr of a wire, the linear scale reads, 1 mm and 47t division on the circular scale coincide with the reference line. The lengthof the wire 155.6 cm. What will be the curved surface area (in cm2 of the wire in appropriate number of significant figures.
The nucleus after two successive
decays will give
The nucleus after two successive
decays will give
The screw gauges shown above has a zero error of -0.02 and 100 divisions on the circular scak What is the diameter of wire?
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)
The screw gauges shown above has a zero error of -0.02 and 100 divisions on the circular scak What is the diameter of wire?
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qz9NFO0xYgol3KlQW53jlY84KO9rO+USkKAEItGrxAbpogwhMDDizzNi3imbCU9c1QIK6DgnAvlB7FzyJlmVK8wANQ2s8qtj1oEgqbR0tp6ktRKFqKGq9OQVOICsXJmtcmhe9cjlcodyVSTR1P8SqUJwNI/TjG/tjuOO1TtI6NmAAwjP2uhQJ3bh4CbwFbANQp11CYfsf2KH6HUlUo4HadZl1GQ3O/79GG547KkhhD+Tp3uy2/1cM2mD/mnOrxbtyzQLe5IO4VIFHgnjMPRvGuPGuA3gRHQCjLE/jYr673wTOKiYeeoeIYddQPw0CWluwt/aopKGPvCXCL2SSITCiUhZdOQVAefYEI5cQaBCLjZEO4DhaNND1ZFxQCN3vZYiJECi0gN4BY2dMWnh9qhFVNgVIG68l6718b47y3pgBIx0R2nVVVIyUZOO3YsaN6P6xR1iRw8AwoCHSDQc5yZ8VTuhQEoKWggBmDQp/llbCkKVvtobucy3nQUbGKKy+K4nUsxRHFtairNFOqYxVY+wGd6/U5qjg2jvNb3SixP7b7bNaN0q7vWlyD+wHcaJconqnS3NYu49TRbrvtdhFTi/e/Xnu226+e+n6jDb0TXgg6S5aW79/zPd9TFbwUXZ6C+SMMRQUNZS5STEQ09h3Do0R5MQYYo7Kwvv3bv7187/d+b506IFvLdnUdI7MQnYVCa4OIfsB7YnQAOtc/Txm8J8ICZEkYnJRLXyDCQsFdmn09TmDWdbDevuZrvqZaMiwaFsuyeSKEogAiqACAPm1h7XturFk8NquyT3E+Xg3PlhcTaxnxgliALEfWJcvSNrSR30AkPA3ehAHuONYuT1YfErfTdgx8ylb/xc3rvxTYegLUKOatgmFKN/FueBwoLQAB6PXBeM88IN6ObRGbCc+GURHeb3grtjECHMNwiGV+GJf6CU81aC4ehuzCo4466gtAhKGmD6LrjLd594elCKx76CxAFmFfIIKmwA/zRAzkzcR1cH+BiE7IxZdein5bTyivIQpL18BgHRkk0xbPktWLHvJMWfQGj3MF94w+AmRoCZ9+2x6cs+/qiplox0A3aA38oDxi4TzbI0hrf/wGklY74FVSLrG+F6WifVlAjJqYbDlOX+SZOo82BKQTIBZHJAnIwDJfg4fBUEBVMiqsvBBxDmCixEKK+mUspOg3gwLtqO+pr28yKqK/qhvLL2nTMfooGlPcox1HBSL6IoNKnxuHXu9TBk9nyU6hEDxUL6QvRcwilTmB56Q0xxFeCzqLi4p7ZrUCvbZwnWXS2IcKWBRFwuOSPmkC50bPlSei01Ow3kUf4hyen7WLTPgSvBUviGUiADzqCMUQwV+DEO0gO04d+1iU6AfHSZRg7dlvLgCrD32AelDXOwP87o1CkBYaGVD6neeCvgFwaCPv0YDeiiHDw+JFUzQMjHGSNlJmI7IA9ZOv+IqvqMF1fclvjARqW5/Rf9BWDEX9xgRC/Uk/Es9QD1WF3rJdfXX0wcjo0teAlPa1gw7TFzEYjM82BY7OEj/RZ3i2CSITCr4YeuPK+wQRFIogIwt0HE+EcDm//uu/vnYgdBartT1xiLXDFWaNcmEF2Fgo88ogCmFNs5wkBFCkMkQoyVFCwbsHz4fV34dQ1IK0Jn0ZnJ4lSyxWDfbseAaAJjwEAw0FEVabup4vi1I97blmoHTTm960zirGU3/nd35nPY/BH4PduxxlAEwqFARqQ8B12kH/lMkEiDBEvumbvumaMSywrv8IfutbPGMJBRILxMF8V4+xqY8ZO3QG6klcDMXNk0WLRhAdiyKQ7nigEVll5oqIe/Bum4IW1TbvmF5KEJlQWIPcRy+Cm9gXiODHvWRKCHC1hXeCu2QZoCV8SqVEZ7GeZa1QbGFVsDhZttxcHUqn0KlY0RS3fRvx432J50dhc88NDIFA1+PZrueBARfWug4PTPoQgW3PikL3OQ3hMRiEBrXsG1ajZIjInDHPBJ3AY+GVrJdaPImIj4idADzezrgGSkr/IsmBxyv47f0z+Jqi//BAGVwx4ZHCp5OabIJxrJ53S3es945tpx+CAeDZG1NtChz1GunNvs/bex08iFB4OEUgAky2QiVsRQAES4L12nYvCR5TCqaX7gXLyNH50FkUFEBhDYcngsaQBih90nXbLlOHBcKSYZ1utLxHXwIQpBCymNB34k1mebN+1gMRwOP+0Xd90VnO4VrQVtz4aQklDsBNIqPMKQHvhsIAGrwD9IHsMIpg2iK7EJ3FWuVJo8dSFkMYg+bR8Ep5HE0QiWw2CRJARP8Qn6DwAYXxrL42gBH9oT8pqNBRAnzEP7Rh0iwjxnnbyTjiKYwc+7Aw8zA2mzJ4EEGlCOqiG/pSYMTLBwwC6+1OQLlybS22xpplyaJCvvZrv7bc5CY3KXe84x2rh4Fycay4h2AtwAEkoTi0g9ZCsWhP55u1sKAMCIMHV8sDiRTKURYP0DagACHXnGU0bQEgBqrgM+9oWu/ZtRu4aC4UGUUOMAU5Zcx4XxFYF3BfD0QnESCGlkB/uC/Xk7IYgr40RlGcUm4pde8J3cRgMnYZlca7CZmC8OgsjAVdIS7HsLSffrKPMclAY1BiJhi/inYdh7FwjLEHvBhybRBh0Dk3YxN9vB7NPCsZBIjg/Che6M5yUww+n+ZvSLGUk4+rVCf2TatoD10DGFjCzmkbT8H5DH78JV6dMtJhcKjXv/71y/Wud70KJjqh66QkcK1cVcCiM8V/W2iPJxIKTdvzEJYUCksgUEcFEK57PS9P5ho6RmG5T1uAiKwYg1fZaJ7IVgV1gKK0PpKAKaXAUMCFC44CUwNZ5hlKk9UHTBXXNal4rkCKN8QTSRBZHAEiDLrb3e529f9EBMXFyNCbxq6+ARRiORP6wZImkjck06ivDwEijANgUMd8EJ4vUIrVAwTYHSfortAfgvlWDWhnZzEuGTg8EV55zhMZQ9AIOHrWuQEfyyHE7FEvwcsy2MUVgIl90yqCYyxgk4K8YAolgrMC+jJ/AMiXfumX1v8DkKVhohAAASS2f93XfV21VLi3Mr2Azm1ve9vamSJgKw6iM8nSoJDnRW3otPhWmSKsMGACAEe54ZQp6s19oPH6mMPBOxIHsaQGa23aIAI43CNglz4pXVdw3js2SHlACm8ESKIbUJrojEnpUzy4WAgqDSWYdNbiCGUtJiamybPQF7wj9DmPmzGJdvL+Ik23WSKVl5GFqta3bNePHIsmdbzt6jWPZbQCEDqtDSL6H+8ViEjISBAZQ1jqXl64gJHD75MCEBilxHgA+GVUhH3TKhQIAGNxeKmsAOcwmQiYsS6s8sk6wVUKzrJSpADaDkisoUVROdY1smjsY7kAJZ2BEpYuyILhiaDp3PcsikGgc4s7AGYgJz8eECrf/d3fXZ9/dHh1DR6crGfvGXDDPS/7plWcw3PQNhCX/shQcA1xHRsVg1RBAYxS0OgrXizwZy16FgY3oHJMrADrXQMV98czc13twd1F9G3t6ROuN7zSlPkLCltiib5tUmAfMbGNBCvBi2kH9Bmi9CCDKkFkTGHt4f0MMCWWOvDdA6bIKHro3tw/zSJOgLdkjbBebcORUzDcVN4Qmso+nU2shmLmfUjzVbjBAEY7FDXrRgf9tm/7thpPYfkDGlQKYAQquM9ZFNcEuHhcPClK1TV98zd/c6Xj/NZpeWa8L54KZQ4AuefuQ4ePduyfRnEO2WuysgCZ3HlA7hp4R6OOUVyD/Qai6wbu6KIIiCosTdvRFdI4pfoCK3RWpAIzEtyje8N781Zs56mwNFGQ2txqiWvQrxgoaEPelgBs7NO/oi/5Pm9lsWrCSBCjYOjpD5PSy1vxWr1znga6qz1jXfIHI9Z+nwkiEwoqiCXHKu0zm4kLSXEJtIaIHbAIUFzyu9svE/CxXHkcgIJycq3h3rLscamWi0dtUd48AJaxc6FVwpLuu5itDYS50oCSx4RSQ+WxwswZYX2zzlnp4Y4DSoqYNwLIo51pFefwboEBcKXkWe2uIa5jVHGdnrPrR0lI1ZRd55mHRwtognqUiu0vUGXUHXnkkTWGBdRx04DLekaoRsAfixYCl5in0qW4BjEe3hUPFH0BUDx7INX0qv3mJeWM9tmJuCdjT3xD/CL+i4YRwKul6IE8Ja+viZ/aDmzoIsdT+HRHZPkxNNUJY0LCiMC5uuJh6mtHfX1dv22DCFrZeGRo6iMM2nnKoEFEYNOL5dJRhKy3vkQcgxJyrrAovHC/eRfotVHZO6xViomVC0BiYpBrpxwpI8CB/kLH6bSsffc1z87h+oDgZkpLTMQz4DG0O/u0xPOWvGDQANdxgveui9sPRHgPMscoYkpfLAswUtg8HEF11iZPA6UFKFiA8adDPB9tuEeKXwlFry1tbrXENYSSEgdj9fKeAAwPKObpKKhSGUH6E2U0hKIPAz79HqhTlhRgM2llEUsodPfgnYgLStP3/NG91sMSBzQnSuGlSETRNwP87WcA+M0YU4fH7907RhvRDg9Uf/KpXzAa9LVgJdqTXP3WR3ivDL55y6BBhEI2qDx4VnKfE7VYGgEWkZVDwTony4JFMspdlYIns4PH0Qw6U3IGlRiD7BwF3cITwMXOO21vXPEMeCAonnZnn5Y4hwHH22P9j/PviagIYAycDWC/GRmy/BTfWYXa42FIu+Rles+Un2wwxXeeDdpJMJ316J0r0V5YldF2s9iu3nr7eW7oNiAlJkKB2a5vUEBoNMoCuKmD2mtTkYtWUJoKxUoJA2cUI0ABJijgSYp3EmXU/kkLg1QsjIKnyG94wxvW1Qx4p5JoGBeyNCl4cVJGIDoX5Wuco7YZIcBffdmWPiWG2BfGSRTbUOJoYX3RcZZB8TcSjBsGLH2A6VCssRUrRAMsfTH2bVTonD5k8CDCyqEkKOFRkwCnJagTNMZWZku7PqCDcxcs1zmbQGO/zsFFDoU07bkIztFX5wmhfFlYfaT3Es+H9W/wUUwsxM0E0FC+PA1gQom3hTHA6gtFgJLjGVDWDAZUE28FQKIW+zBSeLNiXzyQdgDVb0BGsQGbyO5hOA2hUHasbsrYdQNt4AjQJymMlaCJRu2ftGiXR+KdA46v+qqvqsu/o61D0esvkmNkhdqGkkR/8irt16fMGdP/1LUtQMf3KMDDp3ipRBxtOQZ4oVktGa8Peoa8Dt4Nz9jcM4kmvhsb9tE1o4r99JZxEwbwNGXwMRHKnbuII/Ty+xJWD46SQlpPKcccghDKjzUp3uGFs6bHBQkvmwWuzeYnULAvShuU1ANMrsNv5xt1TvUiYEs5+tS+9lgtQM1AEny2hItPg5ciYKWxzNFXvCvUC86YCx4xHx1W3Meg1PYknVeyhEHEqkUpbgQirt99ob+AAk7Z9QGVoAc9G9fkfnhRrEYDmLVoULKcnQsI8VCAiXe3XsyNFzrqGRPPGYUjfjaq33iG2gckYXGmbCyeqXc5SZ8aR/R1XgRFjuIE9FgPFGm7NKnKUfvHKXE86lU/590wPhk2tjFmZKPqp5JeUKA8Vddln/E3qkSiCU+3j2c2aBChMFhp+ERUUJ+eCCtQh6JYKFFKVSdjEQmkUbQR0PVdAXA6gz+0OeKII6qLzxtxnP0mrym+A0BKjVKxH59vOyXNwm8W80maJdqhtIGda6VoHeuafNdetKmuOnLRcbysRSDM2gUOOpt5CyygUMQmXbHOfbKotq254WIUguqsKTEfnZrLDmwFiXkOOq92KdquQmm4JsF1dI721hNASBl71igH78vAdK/eFWCl1L0bljIrDaWl+O15esaeEVrR+/DcHOM62kKZRRqyftAEdYDgeaM0WeajPBnnkHDh3vSrBJHNBSAbK33HDBlAjAkr6opf6Quo61GlSVGO2h9FrEVpf1fiWNv0YTQnCldfpdv0LwVgGINiqPpe6CBe3qhiv8IwbPbPackgQcSgNvmQVUDJsR65eR5YX0Lp4jtZJRQlTpIi1cnw1ZY0oDQpT0pXATqUK3dY9o/gHCvCcRScdtT3m8VLIVPArHrcMguCcgsl49M+53TfCqsZhxptaTc4WNttw7mGhe26/OZq41u53/Hva1xtxxs03GkptVJ8XbtPHpW5Iz5lMHHDtcetV59L7lkATvdhv+cCpAyCrh0YMABfgUvPwff1hBfFGxKUBm6uAxjGuli8Gspa/+Hd8FJYc54Ti49BgmdWKA6/ASxwdWxTeGqx5I7zoMFkq1FuvFAemX4JxNA5BnFbAJbkCvfFMAFyKRuLjCZGl2fcpwANMTV9nLKepQAT458x1DY+0Gz6DCpWDG3eMigQYc2y9A1Kg56Skx4r+wkdYBD2JTqRwFlMvotiEuFXfuVXVkXr84u+6Iu+YH9s++Iv/uJaR7nBDW5Q/6cA73n729++KnR8KF7VJ1ChnHQWYMEDoPwpfEuV3+Y2t6kpqZS79bm+/Mu/vLZ34xvfuLYd5xYUVHxvXlfXYua95w00vAPeiFiR6wXqPEMKlyLnolPg+FheUVdXmgegXW1Rtht5Iuryxjw7oIizBmy8DDQXa4/XyjOJeBqwCRCMgCkABKYKAEZ78UaawmPkyRjongWKwXlZkjwQfZISUoflPMqTATTA3X25tpTNhR6gZEc9z2kKr1Rf0IcYIbzGsOq9T4UHoF8ojAqGrO28GMau7xS9oq46iu3q+m67Nn0ythzHODGu9C2g2RRGDcOHgdOn4TyuDAZE8MmyO1jilCkOW8YE5Sjo1TeIoFMEs0Yp1o0K5R4K3KeMC9dtmRTzRwTuKDsBY/EW3KckAYqYIkJH6VDSaFnNlLVODUBRZBTXne50pzoPRdsBIArQav6etLh+ngigc90GGHrJdYv9mPTpulmJBpxnJrAHTKQzj4oJjCM8EcYDPth73sgTAVQGJE+Cd2aeBz6bJ8nKF9fgHaDxgBHO2IBEu3nu/svFs3Y/PBGplEBQ36O4mgKUKAv9zvkAETAw6HkesmcEY9EP68VTXEM8R/eZsrnwQCRK9A0iKE0GnTEmbibFV/wKI8DrZEBhCoxLBpT+ydBhSBindJV6YhbGiHfMu1BHWwBC39CnecH2+659RiPjBiOBvmuKPqnPGFvrxeJmKYMAERQFZeqFsAxZlrhCSh214mFTvtzPvoQnYj4BrwI9xboP5WpZk7D4eRlmPwdQ+G3tLArdcbe4xS1qyq/1eGR0oJxwn5QWa5sCNEgoPArRd5YJJYYW0ll1MB6JNih0gMqTASZmlwd4+M5zuNGNbvQFHtKoEp4S74h3ow3A4f7ck/u3SJzrNknPIJEVgvNnqQM7yp6VRZFGPMDAEejuOuiBj3iPd2xQ8TQ2EnEF3oYsF/0DzciqJCxCgxAV4JnyRMRNgAnPxDsAJjLOAAHAUiiU9eIVrk//0D+BE0uZ58Vjpmhs5/mMiokAEUYE5aSfp2wuxgRqsG/QZRCheTEFDBGAwUgAAMYgmgsV7TsjkCGiPwUooHLRnPSVeGLEONRHtwIT4BKTdYOaV4AWzxg13PaA6QoGEn2gr3kOfcQ6xpVBgAgLEB/OsvMyWIpeJkVKoXmpKAMvvS+R3UOBUqi8i7DwKWe/0WooLf8fwjNiqfMOKGb1AAxFLN1XXEUQmpJDd+hEFBtlhdLQMShhri4rV5on15WloiNGrAWtJetLWyxunonrAFrOBwiACPCK61iv2I8OQ5NFLMQ2IAKEtA3AvQOfFDMLjOLlgchewtUKCLKcKERgYs0pltUkS1ZT0pQyAGW9beSJhAAdHkZktwQlgGoCILwj18x6RCex7Axu7wKoGPgGubgJAAQSAMi7UcQ9YuB6R+gyINpM02UEAFJA4hrsaw92QVMKgbJIOms80Y8ASVfPdlzRl2VIMdQo7Ei2QEHyWPUN45JSZ3SozzP1nvUJ71bsTd/XN4wV44HBJXamb2jT+Ga4OAfvgmHGCwZQ+iM90BTUGoBisNCNs8hU20gGASIUgEEooOwhs0gFtilh2wx2ab6s4L4Q2cumQClkirVp2fv9ZV/2ZdcEoClhip2SD7ChoHkKuHa8ewR9WS+UGavYOXQIXoggLq+EpapTUTIUtyC2oDbrCLXkXGIUlL94CPAAaq7HJ4pLcY1xve1iX3hQABAgibe4R4Dkni1LbbvkAs9drMZ78D5Y2egiAwyvi+bRqfG7OjyQN0C6goi2DEw0FK9mM0+EsPrVM7hlp0XAmgVrUANt16bfAAwUKUsQDw1UJCYYqLwJdBZloS0eDmWgr2mLIuMlAxEg0x7MrERKg6JxD+3AOUUDwFiyCSLjiWfsOfZtfTNKzfHQ39GxMTYZSPoXvaS/h+dtu2uK69LfvVOeBGWvv8RyKMaIvqN/+G5/GI4KQ4nBSO+1QQR4MZCASPTBvp/FRjIIEPGQPTCWOKsOdcPCNOABCEvXJ0XW18OkALi0FlKkXClpxXdAQdGy/FFIFDCqzXIJgCVAhsIHHJSqa3c/FBoLRoBMhzNAWFk6GktFaigL3H1zn81k9Wc1PBqKnbcDQILGAgquBWg5r+2AjTexHpAACgDkWrUJ/FBx6gMlbTjfXe961wqOPBGufWQxsaJkPIVVFLSV66esUVAst670g0Eii4nCd16A6xy2G7ieVxR9xQDncQAx703x3WB2nXho7aASXBu6CZ3kXliKvBSUhE/gwMPS/7wrn+4FPYZm9H4Am3Z8pwi8R54ToFHPdjTZKDpLPRan84/anzI/8W5QSvo7T7Rv+qwpAAytxbBhTDaFUYkWwwD0HRcaRwYBIhQrigSNJahMkVNoKC30BuXO7WMt9A0i6CHK1SflSsmy9MU6IkPL9VHsKCCxEQBCwauHfgMgFA9ahVVL0VAg7tP1c4kFpXHylBoF5RidijckHiEeQrGjz5wPgLkW1+YagEiAnX1oLvub4GG/EnQcoHGce4tYjmN4KICLRWZA8aY8dzSPa+Sao49iQl28g5jbwZqnvNtW+rjConMeyt47AEyAV3YUcEEvUNiuAe1owKMPeHg8JR4MAAAIaE9WHM5ZTMcnYPc+vIs43j3xZKJdxXl4DgY4i9J+9CqvUgBWW0CG98ioQYuhYV0vAwcNBvR4mYrv2udNa8e9AEHbKSyA7Le6nisr2LOwn/JQx2/1FNuVqNPcHvX0MwYKwLdN0T4A9l27fgvYquvT72hTPfcRx0S9uDfn8N112+e7ax+ieOcSI4w3umWWIKIfGms8oXbCkH7dt77bigwCREIi60awK6gh9I4XbcCy9vqSoLMoWYBA8bLeKVyAAUQo3FDKfvM8eAqUs30UvhgGOgsXTwlTStxhg1eHMCDRQqxtdAuLGdWiQwmgxyxW1JKsER6D8/GGAgT8BgABFPYFwASA2K+ue3BdAEkQmhf1Ld/yLdfEUQIwPW8xIUFgSheI6Mz4XHQRryNiIe7D/bCUXD/wB4xdOzwFhjKThCAOJibEcucp4I55KKg1tBMrzbONQKZ+wYsDZhS6zBlWnIKu8k6BgN9iPMCGZ+UTAGnbeQCR+0FpxfwR5wJKPGHv1LPxPbaJdZiPw5pEQVBKvBpt8i6BmnYYRt6vaxTgB4BA0v1QFuoDYVlvwM1xQImioUhQhSgznzh4x3tezmm7a3ZeBgmwRJ0ZR8AOcGof0AN91Jz78/zQfM7vftTTprqerzruAd0CjLXruekTnnOwBjKT9OchijGP1vQOPT+AOCthsKA59U8eb1Ok+HqHPNz0RLYoLDEDhzKhPFn5rGTZTqy5PkGE9ckSjxgH5Upp8wLQRa6DxR+0VsQrAAxvgGKnoAXcce4UE0WAxmKxsdJ1CICiA+He1TFAdWLBPRQZZS81mFL3G/0UXodz8IaCupIEYB+vwnWH5xEAIgvLNaHdxFV4d+ItgA+4RH0el20AUCxKBgpLm+JhtQMIAML6ZJ26D2BIafEegIj7nAREKHCeGIWL/gFiFBolSVlS+LwA9ZwPZRVFPILCdz0KRUexqgdUtAtQKD5gEcFQx1GYodxtsx8dKbtGmzxUIErRqktp8jAper95TgCFYsdz2yf9kxJw3Z4lilB6MMDTtuvTl9URgwJCFAal5h4BgPbV0U8odOdSKHbniOQB2wCVa/fp3Pqf++HdeX7O4xrdN5ACAgwF40zih7rxvDx38Tn3yUM27oCl96wtzwEAuReembbRQkMUytt79iyA6CxBBPDqk0qbzgIi3iMjdJbXtJ4MCkS4+6wbSo9lTWGzkilrnZlS7ktY2qwCCppiBQyUs+vwHai5LhQWAInvwIXSZtUDPQPL4KYotElBBs2DCgBWFAMlEFYj+kUsRNCbMuflOAdPxDk8A+cAIoDB74hxOCfPwve4DtcN6FybAL02gJOsMUX7jgc8ijacC8BQEDovy58SR8W5bpSF+0BzABOUCRrHe2FRC0B2FaBEYXoePBtAETGOWDbCp1iEQKPv9iliFADOPsX8gqBp7Gd980AABSUb1JyCruJp8Qqd372in9w/pQw8tOkcFDxvwTGOdU71WbCUqOtyXnUAAkBxD941a1e8i6KWph7X71ggCLj0fdcOsJ2LsRH3ox1Kx7XxbGM/Jeg72g/9pk19zj25Jr9do3vT77wz5wb4rsOx2vXb/divXdcQE+TU04ZzaU8d31EwzuX7Iii6LuLa0cgUOWNJ356VeLY8aUZkG0T0E6DNkEgQGVNYsAYqi4jSo7hZxxQ3pcpao1wM3r7EYEFZsOB5IpQrS993n7wRHpHrQQux7CleSp3iVoAAhRU8uwHbFMqQUkMLsDiBjQCvTCi0nXkalDwPBHAqwCTSeoEDhc+78Gx4SdbtUoKeCgAEKuoAGNcuXuNYzxcAOgZgAib3hEJDH8omowR1YAOLcmyKgeZdeV4sZlYr65/S6eqJ4KJ5oECLUqW0piXeAevZjHPZb543D4sXEkDJCnX9wBJAUqgUJlAAcBGbUMIbI4DV76ZEG8GvAwfKggdCkYd4Vp6t8yrhrSoB2G1xfufeLAbBo4/j47pTvlB4meGJMFxkSXkP3osCwH3qA94XKte7Be7AVB/xPTKy1Dc+FO3E8UoYNrGNscFDVgB3UxgejB7XpO68ZRAgYuBBX5kSFB/FKbBMoaJ5UAaohTZiT1MMcEqUUo3YAsVNgYspULoUMmUMRFBD/hGPQgcy6gmS4ZV1ruh8IQY1zpurGpw7y5vbKibiPt2vNn23BAtlDyhcB3DgPQACnoTnBMBcD6/DNaujLgC0Lfa5tqDBHO88KDP7bAda7h1FgcbwLihynb4tlGNY4YAQvYKrZ9FSXl2EUgQilDuqhbU9LQHcrpEhovCcgLbnLk7i0ztpA/60BNiikigF3kGzT6TMV3hcQES8Cu1JxzCeGHnGsXHge8QFGYBoS/0F9Yeu9N1xEZuS2cco4c1qI9ri2RonxoxtjCUxSNRtG0R4jgwc9RgYowyKWcogQIRly61k2VPOYgSCobImBJ9Yj16Men2JIKQAPgVM2bLqKVnpsDwESpcCZtXbJvYhCO67+sCEgtKJWBttYcFQIqx2iotlrLhPoMHr4OnwcNBKvBpgAdQAmuI8lD5vySdwAxCuNbwnHgmwce28OfWADdBRF7CgtsRafAeOgAs/jsoKfhzFsZ4AfcrRwMD5U/4G2WYW8noCmMSJACuKbFocu3aBG68DTQqgXLOBbzAb1Aa48/VFZXhOFJQ+7DzpFSyOBKVk4VSxOFQ0UEExRWKGT8kHDAEUE0PLdnEsk1d99+m37/RYJHw4Vlu2MxTR5Qxi5/Cd8cY7bo81Y0GfRXMybrsaZ9OSwYCITBGKU4aSFyBOQMHKDmEdyFKZJANoMxFvAWCseYobJUQZAweWuxRYSp5ip3gpfcrfNVPcaCKdTQcYJXhtfLp7QRnFZErn1B6A4ukABufhhTh/AEi78H54KYAjtvnu2sMbASDaFRMBdjw898OTci7H+81CB2wRy3GdvI2mAAhuOzD0DnhVLDDBasfxJCbxRHg2AJaFNy06i9WPNuCJUACeOwpOASDeBeNEphSPpY/BCkQ8IwFr15IgsjjCA6B3GIPGIyMD9cmYUYIx0F8kdviMfepF3fb3mLwaJRIj9D990X6eqQxMRrKYVlMYZDwVBhV90tU4m5YMAkQEj1iH+EFplF4sZA/lxjI26MUa+gQRQEEZU8Ss+ACToK/sj4l/PBKeE/AImohr6j50CkpWJ+WOsoZlxlC2rHbWO4vFvcqIotB5Bop2AYh2nbtJUYkVKQDEtQEJhdch2C6Q7jM8FdfK2mlSZO6BZyUOEvchqM/SMjmPEqdYpYJS5oKPwNvzoeR5WpFdhvoSqwI8rLqu74by9sy0YxBS6tMQnoh7MHhZfvqUjCOZZwaoPqVvoQ+AfMQxRgk+nIcJRNv0guN4Z8GdN8WzoxAUIKKdlMUQ45P3LelBooux6l32UfQNJX5LTBCDZUg2Y2WEEafP0hd0XnoiY4iHxPKVkshi82K5fxQs5e27AG6f2Vk8HXEYyprypch9Uuyug8trv+/Sb+1HcQEACl3QG6iI6wATlg3XFY0iqCqVUvAcRRfr9Uj7NC/Cb4BpnzkyqDLeCAXPe6D0nV+qqH3AwLlcg3ZwuorjUXJm/PvOq4s5CjGRUHEdnisgcQ+u2bVK5eRes9pRMJSt98H95uqrw0XnJfquoGk8O4HDrsLSMpBYbQAWgE1DDFqAxBPwToIqc67IajKYBVQFrNfjngEETwvAMgbQD1HXtWtHNpZspQi6h2gb+KImgMgsM4BSNhbBcIaTGBnjb5I+vFURNzV+UNptTwRw8FxQy3ReeiJbEAOMlYtmMOApMxYk5UYReLh9CfSnXClxE90oR+f0yc2lUFndLAQv13bgwIrhNaCkBMpkegSniht1DMUYy2+g6sRO8KQUNWsj3GXWEEWqfZ6B9N+YL2EfJUYZhbK1j+VOseH2BfrUYWErvmub+xxutnZ810ldm+IanMP9uvdY+tp5BPiABiA32OIY96OONFVeCOuqqwSIuAbt8gymIYwTCt/9eS/6FEUuc86nzCnFgF5PgAVvxsTQSBX2DlixPGgepywa1B4jCH0lqSJABlWrPwMSQDTUdNhlFIar8WAc8kh5mbMSSSv0BKNNH2oK5kKgPuZpTTK2piGDAhFCoXD5WXTS5/CDoQwBTF90FqXC4maZsEgM9mbRwRTfXZtPHYHCAx48BEoX/YNfj4IC0Z7iu3uy3afjtcXSVdTRsWOf4jzA1TOJom5cQ9AouPbYH2md0a7jo8Rvx8c9RVvOTwE6b+xzrTqyTk0Z6uDqxDNyvkndbcdTvt6xjDWAPg3RV1yj/oN75o3waIEzsELHMQpYoQZyPIt4TkFDyM4B0t41kGUEyNSJRAlFGwq6zzMK65G1C9A9P4Cl3ZTFEGONQYU+N+4ZF82xO81ivOhfPo1vfcSkUCCC8myK1GN9SZ9hOKcnMqEY0AYm5UKJrUc5TCqUGMueRbIV8cJRUegmKXnz5i/7EJSPd0C5j8o8m1QMEta+AOQ0QUS73o82Ab0UbHERNAJPEMUoecNvnhlvMACBd+GagCRvRuGxABEUBK9DXR6nfomC45kBLLRW9FMKgidEITh+GfvHUEVat3cmJijIrS8wEIKq9V1/GVXs22i/Yr84r++8fJ4F40Xfw2A4p8wu8bimMJx55ZgFfWnefWbwIAK5KWeDFR3T1wOlKFmlrMatABUPRgxCnIIlzepYJmGNu0eUGeu7vWz1NMQ7pezRTSgzFNk0hAFihjrFz8tEE0rtleaLnnI+g1pB2/mtj6GmGBPuO6gEXo0BjUZEa+GxfYoxiQnZh+oy+PWl8JjDOEGb6MspiyP6MuXOCFQssmm+FGPDJyqdwSD9vVlss76b0t7XLFYqkDyjvn6tH0QgXxz0iCOOqIZMG0TMMUF966M82b7Yl3FlaUAEf0hJ9wUi3EvKhiW5lXMI0OooAtysGi99mSRAxDuwPEi7w09DDBKuPk9A/MvnNASV5ZopdgMyUnnRGNKV3YvYBiqLp0Gp8BZYqDwuIBQDWF1tiIcABh4K70VSghn+qFY0mT7QTEUHjoCHl9UMyKfMXxgCvAVJIzxPdKM+whPQ5+33LvURcb8otjEa6Iz2vmZxvHrq+x19TH/jZUisAVj6SFMYMa6LwWNczFsGDyI4alSKVN+tKvitiA7kHCb5bBVE8O3+iZAno7MskwAR3D/rHZCI+fQhlK5BA5DFlqYhFL3Z72IfLECDU3CbwrcdBSWrykRTAz68jrYAFt6RdqQhiwnpIxIuUCGeC3qLt8PjwHmHSBu1jQGEHst5IosjxjyjhTfQVuR9C/Dh6aDQeK5NYURJBOENL0IMbSliIuYtSJXtE0RYIHhQlMdWAlkUg/RZab9c4z7onnmK5w0oWeCsbEq4LxFbQBFMC0Qi1iLTTaqzbDneRGSxRaaa76PWCSOUPtDBZ8vi4VWoC1gAiqCs2Ih2ebI8n2Yf5ZnaRzHoY/pzymIIj1JgWzq8eTw8EAqdQTGq2Kc4joehbyk8klH11ZF1yAhTz3G2+wQQqFDUVjs7y1gDImJzi9BfBg8iMoUoF5PzPNy+QEQWBMsAEKxnkY4SCpY1YUY4oJu1RdO3BIjw0HD+MpX6Eha9Z+lc0xDv0SAWWGdtysARvxAnYZgovgNGdJVMrLbof7KyACiQABriJxQBWkwSgMEOJGIOSVP8dj8otQSRxRLegCC3pYak9guAMziskiF9Hz2p8GJtk9quD/gdq/8qGAz145j45Jnqd+aMqWe77EDHyxQ0EZgn5DqawqgRkNevMDHzlsGDCE7QomesyD5BBL1hzS4veSsgwrIw89SkRJP7eDKuF8eKAkJj4MN1jEgHZZnMO1g2rngWaB+WmkAyq3za4lmggHgIBjJaaxrCi3DtBq/gJjrKe3EeXohPih//DSxGvRNK3yBnpQIc1wZ8xFQI4GFxei68jnbfQf/pEwDMeVBsKYsh3o00W0sXiU0ACh6nvu59RRH7sj3GcmxDZwqW61fGhmK79x3zuHivdIrkDfsZIAqD08Rl9G3bEwEe9B390aRG5yWDBxGDzuCF7DjtRfNEdEQuqSVELGjIupCt5W9ypf3G8vGsHXNJUF+AZCgg4vmLSRkAXPA+Yj7eKUrAQLX+mPjCNES7lDvvwbM3YTIytWT72U5xAAaeyHp9y7uKIjCuNN9f7BslAIgXwpNJEFks4U0yAGVWmgTMSBX7kh3FK46i30ue4LGKn1nyx5hQNyb6Rl0GpO32+25bc7/6tgMqKb7Aqx0TYaSYzOy8jJX1+tasZPAgQqGjE7iZLMe+QMQAlxHBktgKiKCvWLlWyLWulbWuLJ1i/SqfsTiilXYteBh/xTkUofRY76wn1x0W+DTFO+Wdsda48QbxtERmDItQJoy0SjQCbwe94H0DE15iX0tui51QIuIi+ljSWYsjPAD9wHpyjD5eiSxQsVE0lLiEInuLZ0Dx0w/Sda3ioB+pq45j9V3UFgDQl3kb9tuuqBff6QGrXIjVoYubgnLlzaDx9Z8EkQnFA8TDG+zy+PsCEZkaOgqrcSsgoiOaMCQmYmVfHofOAUwCPAJILI6IS6XYhiKyQ1jq4gosKJ162iIAji7ihQBk5xlHXJtU3EjblZprmRHJDTwLz1nf4X3EpELeDqXO2wlrUtBzVDxkGuK6WK6eIRBZBI475WrRR9BN5ojIsMR2oKHE/iL+YRvQQIkGbYXGAhT2K9gLxygyNBlc4mDa0r5iH2PG8kkAhgGDpRBcR4c2hbdjgirGgpfSl84bVwYPIgSdJYvCS9lK5tRWxIvUYWTrbAVEdEQdTjwEreUaWSkWZuSZxD8lKlbbFWSjwHCdfSmuaQqlh0Y0WHgIffyni3cq1RbNZFAZgIChvWQMkKCU7TO4UAxAQLYUb1WQ2/fYTnHjr7WreLfAShwLzYSa44Fo0znMK3G/wGla/QzooiV4Iryt9EQWR4xdAIBiRm2KQVDg9I0i04434P1hQWQN8lp55ibeGsf6mXoWStQHHa+P+bRdXfSU/eKu6FX7tOXfRGUjttPmLb/CmGXwqLsVfdSHpCcyplAsLIStxl10RFaGxRu5sjqJwJjl14GG/xoJEOGd8FKsxsvrcV99geK0hELF5XKvDYg+PBE0kswlvLTViVmGgJnVZ7CZRY5KEL9gFRr4njU+28xeXDbvAt9swEu9VWRMRQA0ApqKbQwGisN5DFhKwnvTDhASo5HyO+kABrrAl4KSKZYgsjjCYxX0jr+lFp9AXcmY0rcYfH4rPGRj3PI5Zrb7rR4PV11GLu9C/+JB8Docj7bi5WiDcYkuQ2eZX0QXAJF2nNFYoOu0xTBKEJlQZLzIisBdWpKkL2EN6FAU0lZER9R5AANXlZJFcaGtZGwBDjSWwK5OKCPDn01Z5l3ns6YS5cIKXkThLbGwXCfl2seMfCBCaQMqA84ABRi8OoOJZ2IfwDAII00S6AAaFiErjwXoM77LzALUPm2jyIGR96Q/CbSjIlETrD5gAmCUSNllabJKPQNtaIt1yFgQD+NRihutF0+RXeh44EY55GTDxREeqD5ljpe/ebBMibGMUdA3xEUi7kHx27dt27YKHvqoYgyLhwAMMQ9GD5pUfwIa+rMlVOzXd22LmIi/efDZDqzzRCRiABEe+rwNzYUHEVa/gTWqsIJZcV4AK4FFatuoupMWCoK1gPtnLY6qM6pQKgCEJQPsIlWU4uCu+kMpWRiUkgAaZaJzyghxjEwuVAuFBZDi3PPmQUN0YDQM64p1L6Nl2uIcng2Px/OhoAXwg7qiqFFZAMwzAtT2+21/UFCUeXxGafYXCj3iJ+Zv8D6d16fivECDIQGceKbAjEHA80HpATCKx3f0GFpDGwwH1+MczfO6Vh4c5SI2wjNxv4p3HJle4wRPo956dW3XXrQbYrttcc44f/M6ok3Hjdpve7TdLrbHdUU78Uni2HaJ+u3vo/ZvVOIa1iv2x31EXZ9iZjxbwW3v2ZhFa1PixrXCE2CkxKrN9vu0XWEARoo3KlV8Td9El4qzAgGBckaNfT61L+7nvPSaek1hbAAhhhMjKD2RTYRSoqAoYFRSFBwy69cAllVDIVO2ttnXrDtJQWM4P+uUiwlINjuHYxTAgGZDW/mDKMdF4BSYUDwyP1gw0VF0Xp2JwmRpW6gNyPhzKq4xt1ggDq3COjeI5imu13UI9BlwFOK0xQA3GM3dkIfvfLMWzxmAU/IsQ4Od4gAq3oUCBLw3vDhQCC+JceO7Z+QeeDQCrPqK44ARK5X35PjwkqSVU0jGAHAEllGAnQI84zuQQn0EeEaJ+pQXMNQ+YLMNqPGyeVKUXCg1fD3PEl/PgAKqzuV4+21X1KMgXaM2pblqA8dPudpvm32UqetzHWjeAHvvk2KUWOB+FePBc1ZiNrfv+gEla1vsV9exUZpteYaepW2OVWx3LTxFnzzHuFbPRl0AYIzTKdY/4y3o32goFCdjQaIHypPX6pPhwMikK2SLolV5rQLufjuegeF43m0E3NGpjjOutakdeg2N5ryeeVNcn77kOH0wQWQT0Rk8MA+Z9RcluGuUhQeNO6SUY1+z7qQF6usEwV3qFBudAyXi0zEsCXND8KRAhHVj8BpAlI00P/V1XsFhPLuBjb4ycNUBHre73e0qzSUtGFcqLuDe7TeoKA4Axcp1bGQlbbWwwl2b4ymfGOzaXU8oBoPCPVKSfQhFZ9DwOinaRRYUn+dosAMZHhqvxHtGQ+jLlIXv9unHYmAyfBgejnGPQMbzpMxsY3VSGpQdq5jSp6yjUIRA3CdQsE19RV3HSCYAaPqN3+rZpr9KMtDXGS9AjsIEcOoDSO2pywK236djXKPtjC3f3Y/7Yxzpo9pQzzncE69afMknEAWygJWB4FyuwSePz/MAxIxIhpnrVs82+xS/PV/t+HQNijbjXoxXvz1z7TvONaDAI57m+btO7Rm7aCmJHBZPPfLII2v/Rk8Zj6gt88bQTfSPuiguFJbfxj0DEN2FWXCcYxwrUG8/+ppOQZmixEwsdA77jG90lnO0VzkAgu7ftXqvCSKbCIUoQ4b752FGiW06AQtOR8U1xr5m3UmL9gwg1ocBwvLZ6ByxzzEsUp1UpzbAbWOpsX5cL2XBdWXd2cZqYtlRQKwoA92x7lFHFLhDc4mnABOBZp0PsGkvLFifijadb7OinkJRsTApHtdmwBm4wBwF0xYWOmBkUfHUdO5pC3rBuwYiBqHnsejCQwPqgBkIA2Ngq194XqxLn8DRu/b+Wf6UQlAfFJ1+rXgP7tvzpQgpOkaJ/k95K5SsbT5tBz4Uq7qUtzrapKBDaSt+a1dfVXyPOgrF3DzeMRR8nNs+2xXnN0bEAShLfRaYUJQKZR2Wd1jtkfrqOMDFEmelM0wUlrtiv/sBCPZHUScA2mfcg+fmfABBm9rwqRgv2vJMKeOgIZ3fb94F8BCjFK/kKbpf78m48K54K8ZJxNWMH2PHMzFmjOsYj4xE+4GxZ+TcrtO7Mm69b+AfAOsasA/AST9pCi8MqLpf15AgMqF4OSwcHb1PmoPb7aV5wZTaOMJ65yE4VsGLc8tdp0IxhnLhlsf2KOpSOtqgdNAKOqkOZEAYqDqa+Sc6O8vGQNCJKX1tU1LtdjcqAFKnpxBYxyx/lByLjlISk2gXdSOOw6JilbIwR9XtWgxKA1mA07kEwUedwzaDnJKjrCgZSofFLx3TILW/S3HsZsfbL07nXBQGBeGdBV3ik2FA+dinvut2fZSLdxuKmkJjyfNWvVPvhSKiOCgn4BP0jBJ0TWzTB4yPqOvdKvYHr8+AAFroJu8/aKdmn7At2nS8bfqy/qV/6pu2U26+o6/cFwXp3nw3btyjZxM0mftXAjzdFyXtGSm2R1GPsnbdxoH92lA8T88lFLXzuyfP2LHx3KNNn9pSP9rz23bX4Zm4ZopcoJtxxEMANECVB4Yd8Y4CaAO46CLACNjUA8b2ASvjxzsOENSeesYW8FMXIHtugA+dZUy7l6Z41s6VnsgUhBWs03gBXqhO3pcYLM5hMOOG5x2LIPh5igp/agkVExrFh1hRrhOAdMnqQscYtGHpGRRKWI/NErQGxQ7IDDYDo2ltTlKatImsFSDiHEDUPqVdn5UJTNEHBiEKkrWrDQPW/q2WuJ9of7PiPM3iHkaV9r6oHwCIR3ftaCdxtL4KCnW9slnd9n59LhIHIomAZzY04UlS+kCEx281XzFJFJOCrvJb2bZtWzW4bEOto6nU4YnZJqOLESR2wjDwG4Ognvr6KqOQ58RoMK/MChb3uc99KnsRQu8AOynoxpl+IWY4Txk0iPAIWA3QH4qzvPoSgU0WIguAZRAB8nmLYC/LkJWH8qJgeSa8Arw0S6uLRBBV8BEY+c5CbRfnts9gwwWzrrwH20fV30rRRrTvGlizBiIL3TsYdYziGNfAsmVhsjQjOBttbrU43jlZuXGOaRTXpLjHCBT77nwMBBYsg4BV7V0qvIr47nrWK1GnWbe9rVnax48qzXqeRzyT5nbX1/RseDF9TELtW4wB3rhVJhgj6DTjjBeCXuRZ8FjC6+Tl2M+oZUhgLoyL8DJ5JDxN371XbWiTZ2I7D56nZjtQucUtblEztDzPENSottG66Dr9ZN4G7eA9EQrCQ2W1CT6O4u2nIegolIoOwj0e9d8S8xTWSChzljceV0fUuWchlAirmSs+bRHgN1gMNtYbIB+iZbtVCSAHLJRx0FaLXhh26GVgHx4iBWp8Bj216AVN5JoF1GVX8vAZae6JNxEeIu8REDBkKX8eJE8CDYYhoJfcvziMxB/bGHc8CQCFKpYBxvji7asvGG8tNwu28lQkaYQwpBiKvCJjfaOEl1nJ4GMiBpkO6wWhK1hCBh+3epoPWFyC9aCz4G0X9f+wgYkYC36eddOnd9YUfL3BwTqbloLn7fGEKB+8M8qMZcbrXJWZ3QwlxTP1bodQGFz6nv6A20c9Uo6RJLDIBUgolD6a6aY3vWm5/vWvX5cpuu1tb1tudatblZvd7GZ1u0+/JbnE5x3ucIeazi/pxX7bZFnxKkwgvvnNb37NNsdoVz2ftt/mNrepdWI5JLSWMeyZoq5QZo5Fc4mfAJhI+/ZdveY2upCu8l76ksGDCEVDgfEQ8IksA5kPEJuX0iUmMEpkXLGA8dUoEiC1yELJ6kx9eWZt0cFZVQLa4yYerCeUZmTeAW0eIMpAtotYDfpn1sFEStwzZZjMmz5YdKGwgL/AddBbPv0eSuGFoLDEJfyNA2Dwlw0BABQ9IAEEftuuiEsKiKPALKAIVG5/+9vXOoBFka4v7d9MeHViPwDRBrC50Y1uVEHEfjFOmW2y3XhGAMmxst5Qa2gzhafOkPbJK7KPvkKHosH6ksGDCAEUOilOkRJToLQMHsqNFzGpaIMy84KAyKJ5IoKYrA6WSCi7+O35UILSTcUWKGiDXOrgtGI73H8d3TOaVHiX4k+oARYtemTenHqACFBOEFl+QSFSwGgj69wJrkcx+RDA+M4zjt+KOR7miojdKTwHCSEoZjFDnoV6aCpBd3UF4P0250R7Jk5LIPFnWD79Nm9EHAQFhnVBqaHTAAXPXAEkwMOn37x3oCIm0+f4WQoQISxTCpGHQMFTlNL/PFRpn7ZPMvgpZEE0So3CNBlvUcR9uWdZHDwwgUzWuiAdpc5TAySUMQsrrHrPZ1qdS5acjCjnn0TcByPAQHH9fi+K9c/DSgBZDWE0oIWxGmg58RBxDEX8Imgv301SjKIe6o4CpytQ7ZQ4mlfsBL2nDtYEfRbZeIrMP7PWjSPnRKmp75xYECnZjEI0VUwOjgnKiu/toi7dl3RWBzHYWdoQmUVLwXroXYWy5elI8+WJLFpgnaIFcjqh3HyZSQCUy+uaXb84iU4vr54nAmh5MKMEaHKBx6WmeIIsI+DUVQCdLKQYXKzBlJR5CqUd82rQcooYRWToSSSI7UHb2WZ8ASHFONKO/hxtKb43M/R8t0075oLwyGPbNNiUvmRpQYTwTsRFUFAyuKQjdhXxBUqYZSGwvmggQlB3rCDxIYDCreUei1XowLwEueU6uOv3qYPH7HqZXLKAWDCUOQC2bZwObGCxpATBuwqqLSZqTTOelZKS0p8sNYgQHDb6hiJFa3UVShd4CPais7iJiybmsogDcX+52oLSVgHGpfKeeFLoLPXcC6UvUC1+pI4lVWxTF+jib02UGidNmPUklXGSlGLeE88JkACypI5WQ7znfNfDlaUHEcJCl3s9yRwG9A6OXm42K3kRs7PwnuIf1tuxHIpAtyCerA4BOLGGmOMCDAXngAjPRdaHWbS8D3SS5UvMM5HDDnA2E268VE7PqIu4dt6T4CNarE8ON2VxxIx39A96SEwzwWR4shIgwnOw1ACLW8Csi4gfiDEImOnw68US5i2uzcQo6Ye8CJObLKfAwheccx9ovlgbC8XnuwlMvAhcrdVIQ5l7ZuPEJgT9TLISROyiCGKpFefmDQ3hr4FTJhdxSjE6hl56n8OUlQARfD+rW6ZFVw9C/IByAyQU8aRzIfoSCl8cxDpW5syI4wi2SyeUqRXKWaYIkEFdyRyRaghsBfKkI0pfBLziSQJ7mwkqapJ5Io4xK11GiqyWeS8qlzIbkRCCXhV3yzk4w5SVABHWNasaAMh46KKgrFoq5xr1I3NiUT0RWSDiIaglNIHAeWRtWbgthEclh10mF3BBfcmssjIr7wPo+C8F8QnB9s2EJyIt17FdqSjPWFYW2jFBZPUEgCSIDE9WAkQoQUFmVrWYQZdZ3DKYZDux7s2JWNTMIfcGPFj1AXSuncfBmwrxW/zDOkHAw3exD8egFcRQrP8jUC8zbTMB1MCL59MVRKQ5isfwZhJEUlKGISvliQABnkgXJWfOCQABRhT0onL2LDnX1rxH3wUw0QUhguvAJXLY5bM3wcJvzw3NMI5CR3mhyMRVulJ9UnxRhpIXEkRSUoYhKwEi+HpBZOmtXSccAhFKEl9P8aZcVwCO+R3SqLsmLwAuz1iMJkEkJWUYsjIggq9Hk7DIu4hgOk+GlQxEkru9rkh7tlSDeEZXL80z5u0liKSkDEdWAkQoOFk/5kZ0jWUI+rKSxVXEWDIF9boiVdg6P55x16SDBJGUlOFJeiJjCjoLXy94bKnoVfk/i3FFMN/zEVifBEQyOyslZViyEiAitVU6KzqqqycS2VlSfPH/CSLXFSBioctJQSRjIikpw5KVABFLoFt+mYXb9f8zZC5Zg8s8CJ5IV49mWcUCjLw08066gog5KmbVC853TRNOSUmZrawEiJgcyIsAAl1X33WcGd0WMTQD3lyKlGsl1s7yfLp6EeJO5qdYbThBJCVlGLISIMJKxrWbmY2W6pKCatVeE/N4IsAkQeS6YhKnwDoQ6TpPxPwbkw1znkhKynBkJUAE/ST91IRDyq456W5cASL+CRBfb7G4rh7Nskr8KVXXVXyJ5IXjjjuu/idJeiIpKcOQlQARCk5MBJDwJroE18VALHdiGRCrjloaPuVa8X8i1tma5P9EALVnK12464TFlJSU2cpKgIg1mczvEPgFIl2C4rwXsRWeiOXOzz333MN7Ugig9q+Kk3gi/sJXPMS/KqYnkpIyDFkJEJE6Kh5iIpv/rNi1a9fhPeMLjt7aTmIilk/xPeVa4aVZWsZz7goA6CwrJZuwmCCSkjIMWQkQ8R8Z5negW/yzXxdPJFbHNWFR4Nc6TynXilWB/Q8JoO6adOA9iav4k6wMrKekDENWAkTME2ElmwyH2uqioKyXhcbyPxzolgysX1eAiH8lfPGLX1y9tC4xDUvVA3reTIJISsowZCVAhPfBShYX6UJlkVjF12Q48xmSbrmuAGr/Y8+T8O+KXUAkV/FNSRmerASIyPg5+uijKwB0nbEOOHghb3rTm2oWUcp1xVIw5om87nWv67xUfi7AmJIyPFkJEEG1POUpT6n/sd4VRPw5EwCRPSQzKz2R64qJgrwIy550/R/7BJGUlOHJSoCIv331V6+s5K4gYl6Iv5EFIpaC7/IXu8sskg7EMyQe+KfELrPWYwFGYJ0gkpIyDFkZEOGJTAoiJtIBEX8F27WdZRUTBI899ti6HDyQ7QIC6YmkpAxPVgJELHXir1vNNu+6FLyJcFaXpeCsxZUgcl2JmMirX/3qGj/qEliXvGBCaKb4pqQMR1YCRPD1r3rVq2pMxFyELv9KiKIx0fAVr3hFXQ3Y0vAp1wrvwzOWBu3ZdPn7YCm+UoQlQOQ/R6akDENWAkR4DtbNeuITn1gnCnaZDCfjCB32pCc9qa40K4015VoBzlKoX//615fTTz+9EwgkiKSkDE9WAkQouGc84xnlvve9b/3Piy4gYnIh5faYxzymKjr8fcq1AlSlQFsZwJyRLnSfeSJiKjnZMCVlOLKwIIJTtzzJjh076rwMir9rodSe9rSnlXvd6141wC6TaFS9jYrFF/H1j3jEI8oLXvCCGmcZVU9xzeiv884775oipmIfMGrXX8QiTdfzF0MaJ53ZSgAvf/nL62RDf9rVZbl9MREZXrzFLnRYSkrK7GVhQYQiM+dAto5/u/PPhFstLGOFYnvoQx9a7nznO5f73//+9fdrX/vaum/Ucc2izmte85qq3CzrAYge+MAH1iByuw3fbbO8CtB6/OMfX57whCdUGu1FL3pR3Y8S49EsekFLuVZeAU9uM7EA48Mf/vB6r0C7CwgAn1h/KyUlZRiy0CAiG8q8ARk/FPBWC+WvACFxjEc/+tHVk+BRWInXvlHHNYs6lCrFhhJ7yEMeUimtAKJmG77bJvj+9Kc//RoAEUdBgdkvuK/OIhf3Iob0qEc9qmzbtq0CJJAYVU466aT6p1+A8453vGMFaX8sdcIJJ4ysP6poA4B4R3e/+93rOf175Mknnzyy/kZFWzLFpGGLhVmiPqnHlJT+ZCXoLAW9ZCIczv60004bWWej4m91/RcJIJCltVEbQ6ezXKt75E0BQwBIwY8qPDSgyUs74ogjyv3ud78adxLbGFV/VAHqCrC9xz3uUR70oAdtuY0oUrlf+tKXVs/PH5FZeJPB4B2YILrIBQWoXHnllbXvK2JLzX1DKRIjlIxtLb+sRGCdoFdMFETTdF2B19In0nt5SMv+z4ZA098AK5aNede73jWyWNzSqsb+kOoud7lLOeaYY2p920bVX69ox/wQKwugCv1FrjXPRtXdqPhTLDGrhz3sYdXrRLE99alPrd4UD2mRC+pQ4X0/5znPqQDO49VnzU+K/YteGCDmZLlm/9/DMElZXlkZENGReSKUCTDoIqxC8yBQN+ZFpFwrlMUDHvCA8spXvvLwlq2LSYo8PUDdVVi+rsV1mLeCCpV67M+uKOdFLq5XAYI8O0DIG3Qv+i0vegjF+ED9oo+f+cxnVmA3V2sIBcMg1VySh4xDJf/2YWNZGRDhOQAAlhK6povwZgCRgSE7K+VaQfUdddRRNf7UVWKl5En+YpfIKDOvx3v23n2is7Zv377QJahPz0EyA4Xmv1nsY/jE/kUvsh9l6kmS4AWiF9GeQylBjb7sZS+rtCqjhHFiPbihlVlkOa4EiOzZs6cORnQWK3eSpdxlLKFsBH1TrhYpwG95y1sqdST+0FUoTlZsLsA4bKG8JDRYsBQtyShAAQ+h6L/+F0c2p/6MEhVf85fNKLo+y5vf/OaqoxTfR9UZt6ASfTJE+paVABEBShk7Xg6evesfUxHZVTqZNNaUq4X1ycOT0WWRyq6iw7MEceoJIinzEH3ZGOeF6IuSOxSeVd/F+SSGKKP2b6WIUfqchZ5aCRBBb3Cx3/rWt9YVfbv+3wVhkaCzWFm5COPVMQhBcTSWeT2TpNOasCg2gHZMEEmZh6B/ZFaKiejLVlHAYuibfRdp6ZQ+loNBNarOuCWOlynat6wMnWU9J261DJ5JAmXASLAW7QKQVv3PqcQbBH7x3gKTkzwPQcwAowSRlFUU4wcdOCRZCRDxYgQng2+cJD1X7jtLgdIUfDOhbVUVHo8OKJuPYTJm17/FDQH0snu8owSRlJRhyEqACBdVXOSNb3xjTSHtmuIbwpNBjYkBABLeySoK1xt3LC3VM5h05V2BdW0JKq66h5eSMhRZCRAhKC2ZF2ZG+4/0SQWNQ9mZzY3HByqW6sChLoMCBAiy2Hht/h8EcJqJzNuwtIgsN/ct6GjZk0mFC48OA/LiTasAIrwt/XJo9EVKSlNWBkQoQBO2WM7TWEuJd2MCo2wvKYDW0zLLWFodZSjXn8KlfHlBgvvxKSCvxDa0UHPV3HaxXTuKzDK/ozjOttivNNtqnqdZz/fmsQAjiudj1jmQFJ8AkGag8zbMB+F9yVADIFI5KcJJBVhZb0tQHSh1+WfEIYn+49kLfE7qwaWkzFNWBkSsP2QhRZOHxlmVdlyhCCwNYmkKfL7Jcrydxz3ucXUBw2c/+9nVYo8Zx7wh6bDqqysobWkLx9hvAUQphlHUd7y4g7bU9dssbPXjeLOcn/vc51ZAk9rnfOa0OI/7dow4jjpoOMdIDpBOaJsl8p/85CfXZUcsGilP3mKT1rNybtfnei3TLkNN3ML/qgPnSYVCBRzaFmORHWPbMov74+FJKZ0GCKekzEtWis4yAcdigeaMTNvS1Z7lEqS7Us4PfvCDy73vfe/yyEc+sip4StuaUPYFoFD2FDrlbXkLSh4o2BdLYFD+vCfK3AxgQOI3byDa5AFp4+ijj65g4HzattQHsNGmYyxFoY62tANwHGsbwDOxyievSuFtuCZtADez9XkofaQNml/ifr2bVaCygAhPkOeX8Z+UIcvKgAj+GSXDMhe7MHinLYAEdcS6lLXlPILP1tmSvsoDQhWxtBWLHKK+ZHuhhdRxbOyPIoYjc0net+NjiQyf9onDoM/ktvvUbrSDUpNIoK5j1VEcE8c21wlSgKHcePscy2JGNwEP9zdtL0F70q+l9zr3qoj+oiy715Wy3LIyICJ4SSECEnEL/1SYMn+hRL0X1BuPCQimpKQMR1YGREJY/miTSZbnSJme8HIE09Fz6MZJ069TUlJmKysHImghWUVoLWm6SSXMV9B94kEmKwKQzFRKSRmWrByI4PbNcbDYmUDxLNaWSRktYkTmhQjwS5VOSUkZnqwciBBAIksqVuPFy6fMVvwFrJReGWYy2qRKp6SkDE9WEkSISXTSW9FaspNSZicoK5lmsrGkO09jBYGUlJT5yMqCiHRXWVovfOEL66Q+6bApsxHpz+JSEhymNWExJSVlPrKyICLl11wIdIpZ2v4IydyKlP7EpDrBcx6I/99GZ+VEu5SUYcvKgggxAdGEQP8Dbaa2v2XF1adMX4C22ehm0ptVj8ZKGjElZfiy0iBCUCniI5YEsYSIOQtmkJu/kDK5iH/IwjIj3RIu/hXSGlxJH6akLIesPIgQS3mYwW6NqGOOOaauZ0XpARLeSs4l2brIeAMgnqtMOOt+WTbfKsCWnMlnmpKyHJIg0hD/cWyFWn9/64/uzSURfGdJJ3c/vgAJfx38hje8oQKILDirAFtyxpL0KSkpyyMJIiNEyqkl2MVKTIQTdKcULfl+6qmn1kUK8fnmmyzjHwr5DxKz+S3eaKVZy+jz1nhmFnK0wKNnZJ2r0047rT6TU045pS4i6bt5H9bCssw8EEERZvwjJWU5JUFkhAAGCvTEE0+snolsIhTXYx/72LpEh4UCbXvnO99ZgQRtI7ZC2TaL7Yu0SitvyjVtdD3+oMp9m80PPE3GBJrScq03Znv81wn6D8iatOn/U3x6TmIeZqADGCsB80yWEWxTUlISRDYVlrd/3KNQ/ReJ/+gwQfG4446rAXkeij9SspTK2972tnL88cfXbf4VEADZRqHKAlNQOv6TQz3HiRHYrg4lrbz97W+v29VT7HOcT9sVx7L4KXlK3+93vOMdtV4sQW+7a/dpPobjXbNrdX6eg+3qqiehwLndJ0A49thja8aafe7JH1HFn1yh/ATKZVtZPNEnULHfNWRiQkrKakiCyBjCcmdJ8yrQOqgelA7rHEgAFErVHzdR0ugbihidQ7GidvybYfyjIWveHAnK2NpRtqsTf0TlGNvFFBT7WP4+Wfn2ORblRsk7Xyh27WvPdvEcK+P6lCigLddF+Ts/MLFdXfWABLC0GKI/sQpvC0UlXqT4i1y/AQ4Ky4KWAIPn5fl4Thk0T0lZHUkQ6SiUpdiByXMmLVKm/lAp/ugJlSMzyfIetosJKOr6FE+IP4HyWx0BfMUxtqur2BfFeeI4xcx75/PdcdF+bHcenzwq212XYrtt8WdVfgNG36Mt39F14iLA0/0CC3Np/PaZCQcpKastCSIpKSkpCyKMMmWr3jwWwF+Ai82aljDLGGSCSEpKBzHI+6Dt+mo3ZfHFewcEylZAwHESZrADkU0JVGYlCSIpvUsoxnYZqrh2g3baE1G1RYHkBNfVFcpf2er7d4w+qfBk0hNJmZvofNPuhAbEqDJU8WwijXua96GtBJGUoclCg0gOpNkLiwavOs2Aufc4qgxVXHvQDtO+j6E/m5TVk4UFEQOpD8pgHGmfzzUoqyDjeCKej/1KPCufzRL7Dx48VNtTDhw8UPavbTtg+6Grj12vLLoE7ZCSsuqysCBCAbH0AMmkSkU7ZmJLSd2sLecFGD5DXIOgVbSxFaE8HSM9VjvNdocqnqFn5N5GPU/3uH9t/4EDa8CxVvbuvqrsWSuO2btvf9l3DUg5Nsq1MgQQSVkO0deyv00mC01nUTTTeME7duyok+TM4dhMibMugQ4FGeIaZD2Yw2EuxVauCYCYi2Guxs6dO6/T7lDF/bdBxKdnWwFk/4Gyd+0Z7tvHk9yz9gyuqCB65VVr33fvLbv3OPbaiYmjSkpK36Kf6cPrGUMp48lKBNatHEuJA5PNOsvVSvAL6RxxAv98OE4bTQFI1o4yaY8iHRoF4l5HlXhG7oeHZtKlZ3PFGmju2bvmfa2BxeVX7S2XXbGn7LjsqnLxpVeViy7dWy7ata9cctm+svOKA+Wy3QfLlXvXgHbvwXLhJZeW7edftHb87rX2nXetjPBSUlKmJfoxY0jxvQ/Rbqyrh4nw6XdbvxDbNvLwxxHHYk3ovFnpmpUAkZTuojOPKjEI9u/fVy684IJy5hlnlO1rnt6ll+4ql68hw87L95YLL91TPrtjb/nMxXvL6RfuK5+8YF/5xAX7y2lr5fSLDpRPX3KwbL+0lPN3HSinfebC8vFPnV127FoD2rXxo/m1M7mCep6UlD6EolX06T7EOGE8UurAwyclP0rB28bonATUHMtoVQDKLCRBJGVDaQLHNWVtYBw6HBgX87jiisvLrkt3ll27dpVdn7+8XLJrd9m+46py5oW7y8e37y0f/uz+cvJZB8qJa+WEzxys5aSzD5ZTzjlYPnreoTVAOVjOuOCqcvaFl5cdl+8vV+1bsxD3rwHVWvsJIil9SvTpvkTblLkCJOL7qHPaBnRGeSnjimN5PNOIJY8rCSIpG4qOCDSic9cMq7VBsG/f/qtpqz1rILL7QLl89/6y84o1r2TN+zjrot3lU+ddVT762T3lQ2fvKyd8+kB535kHa3nPGYdqee8ZB8vxa79PPOtgOfXcg+X0i0s5Z2cp23eVcuHnD5XPXXGoXLb7ULli76E1UCll91pZO13Zvza+eCrGx4zGSEpKygaSIJLyBVKB43CpwMGCWitXA8e+Gu+4Otaxp5y/c285Z8fecubF+8onz99XPrZ9X/nIOfvKh87aV0769L7ygTP3l/etAcZ7Dpd3rwGI4jsgef8akHxwzTP50DmHykfOLeXU7YfKx84/VE678FA54+JD5awdh8q5Ow+V83cdKhdffqjsWgOWK9cAZe1SKqAcBCaHrzslJWXWUsr/A/aYJI2vk3jyAAAAAElFTkSuQmCC)
The number of ways of dividing 52 cards amongst four players equally, are
The number of ways of dividing 52 cards amongst four players equally, are
The half-life of radioactive Radon is 3.8 days. The time at the end of which (1/20)th of the Radon sample will remain undecayed is (given
The half-life of radioactive Radon is 3.8 days. The time at the end of which (1/20)th of the Radon sample will remain undecayed is (given
Screw gauge A has a pitch of and 50 division on its circular scale screw guage B has a pitc of 0.5 and 100 divisions on its circular scale. If is least count, then which
posibility i true ? What is the parilrility
Screw gauge A has a pitch of and 50 division on its circular scale screw guage B has a pitc of 0.5 and 100 divisions on its circular scale. If is least count, then which
posibility i true ? What is the parilrility
the screw and stud touch each other, the edge of a certain screw gauge is to the right of the C mark on the main scale and 5th division of the circular scale coincides with the line of graduation then what is the value of zero error ?
the screw and stud touch each other, the edge of a certain screw gauge is to the right of the C mark on the main scale and 5th division of the circular scale coincides with the line of graduation then what is the value of zero error ?
A radioactive sample has N0 active atoms t = 0. If the rate of disintegration at any time is R and the number of atoms is N, then the ratio R/N varies with time as
A radioactive sample has N0 active atoms t = 0. If the rate of disintegration at any time is R and the number of atoms is N, then the ratio R/N varies with time as