{"id":9479,"date":"2026-06-01T21:33:48","date_gmt":"2026-06-01T21:33:48","guid":{"rendered":"https:\/\/kapdec.com\/help\/?p=9479"},"modified":"2026-06-01T21:33:48","modified_gmt":"2026-06-01T21:33:48","slug":"representations-of-motion","status":"publish","type":"post","link":"https:\/\/kapdec.com\/help\/representations-of-motion\/","title":{"rendered":"Representations Of Motion"},"content":{"rendered":"<h2><strong>Kinematics |&nbsp;Representation \/ Equations of Motion<\/strong><\/h2>\n<blockquote>\n<p><em>Reference: AP Physics Algebra, Kinematics, <\/em><em>Equations of Motion, <\/em><em>Equation of motion on an inclined plane, Displacement &ndash; Time, Velocity- Time &amp; Acceleration &#8211; Time Graphs for Motion in one Dimension<\/em><\/p>\n<\/blockquote>\n<p>&nbsp;<\/p>\n<p><strong>After studying this chapter, you should be able to,<\/strong><\/p>\n<ul>\n<li>derive equations of motion with constant acceleration;<\/li>\n<li>describe motion under gravity;<\/li>\n<li>solve numerical based on equations of motion; and understand the concept of differentiation and integration.<\/li>\n<li>know displacement &ndash; time, velocity<strong><span class=\"math-tex\">(v=u+at)<\/span><\/strong>-time &amp; acceleration &#8211; time Graphs for Motion in one Dimension<\/li>\n<\/ul>\n<p>&nbsp;<\/p>\n<p><strong>EQUATION OF MOTION<\/strong><\/p>\n<p>Following are the three equations of motion for an object with constant acceleration.&nbsp;<\/p>\n<p>(a) &nbsp;&nbsp; <em>v = u + at<\/em>&nbsp;<\/p>\n<p>(b) &nbsp;<em>S = ut + 1\/2 at<sup>2<\/sup>&nbsp;<\/em><\/p>\n<p>(c) &nbsp;v<sup>2<\/sup><em>&nbsp;= u<sup>2<\/sup> + 2 as&nbsp;<\/em>&nbsp; <img loading=\"lazy\" decoding=\"async\" alt=\"\" height=\"23\" src=\"blob:https:\/\/vault.kapdec.com\/6f9bae1f-c995-4576-935d-f6f35467c4d4\" width=\"74\" \/><\/p>\n<p>Where <em>u<\/em> is the initial velocity of the body (if the body start from rest u = 0), <em>v<\/em> is the final velocity, <em>s <\/em>= displacement travelled by the body in time <em>t <\/em>seconds and <em>a <\/em>= acceleration of the body (take <strong>+<\/strong> sign for acceleration and <strong>&ndash;<\/strong> for retardation).<\/p>\n<p>The displacement by the body in n<sup>th <\/sup>second is given by<\/p>\n<p><img loading=\"lazy\" decoding=\"async\" alt=\"\" height=\"34\" src=\"blob:https:\/\/vault.kapdec.com\/0d09580c-c271-46b8-b45c-f8146ab64c60\" width=\"102\" \/><\/p>\n<p>&nbsp;<\/p>\n<h1>Equation of motion on an inclined plane (Kinematic)<\/h1>\n<p>&nbsp;<\/p>\n<p>Let a body of mass m slip down a plane, which is inclined at an angle q with the horizontal. If at t = 0, the body is at the top of the inclined plane, then in this case u = 0 and a = g sinq&nbsp;<\/p>\n<p>(i) &nbsp;&nbsp;&nbsp; In this case the equations of motion are&nbsp;<\/p>\n<p>(a) &nbsp;&nbsp; <img loading=\"lazy\" decoding=\"async\" alt=\"\" height=\"23\" src=\"blob:https:\/\/vault.kapdec.com\/d8ffa37e-7a97-42b2-8eec-67d1591217a6\" width=\"73\" \/>&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;<\/p>\n<p>(b) &nbsp;&nbsp; <img loading=\"lazy\" decoding=\"async\" alt=\"\" height=\"29\" src=\"blob:https:\/\/vault.kapdec.com\/d81a2053-c9d1-4e1f-9fb8-843a4bf31021\" width=\"84\" \/><\/p>\n<p>(c) &nbsp;&nbsp; <img loading=\"lazy\" decoding=\"async\" alt=\"\" height=\"23\" src=\"blob:https:\/\/vault.kapdec.com\/1ec77520-45f2-45bc-8bfb-edd42b960d04\" width=\"86\" \/><\/p>\n<p>&nbsp;<\/p>\n<p>&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp; <img loading=\"lazy\" decoding=\"async\" alt=\"\" height=\"161\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAATsAAADWCAYAAACucSUvAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAA8nSURBVHhe7d07jFXVGsDxNTexG6SA3GREihFhLrcg4gMbC4JTwA0khEgEL4mNj2gsjIb6ckNjghJsTNDWhJhYmEAuFEDGhMKrUahuLuIrQQYLpnCgs9D5lmcxa\/ac\/Vjn7LX3evx\/ycl5zqCbs\/\/z7QdnJn5fogAgcX8ZXANA0ogdgCwQOwBZIHYAskDsAGSB2AHIArHDWCYmJga3gLARO4yF0zQRC2IHIAvEDs7YdEWMiB2csemKGBE7NMZEh5gROzQioWOiQ8yIHWoROqSA2KEWoUMKiB1KsY8OKSF2KMVEh5QQO6zCRIcUETuswkSHFBE73MdEh5QRO9zHRIeUETsw0SELxA5MdMgCscuYmeiY7JADYpcxe6KT4BE9pIzYZagYNaKHHBC7DDXZR0f0kBpil5GqeJUFkOghFcQuI+McdSV6iB2xy0DTSLF5i5QRuwyMM9EN0\/b3A7pA7BI2ygRWFzJCh1gRu4QRJmAZscMqVZFkfx1iRewS4yNGEj87gAQPMSJ2iWlr09V8H\/v7ETzEjNglwtdEV0TwECtil4hhYfKF4CFGxC5yfcWG4CE2xC5yXU50RQQPMSF2kQolLgQPsSB2kepzoisieIgBsYtMqDEheAgdsYtMSBNdEcFDyIhdJGKJB8FDqIhdJEKe6IoIHkJE7AIXaywIHkJD7AIX00RXRPAQEmIXqFTiQPAQCmIXqJgnuiKChxAQu8CkGgOCh74Ru8CkNNEVETz0idgFIpeVn+ChL8QuEClPdEUED30gdj3LdWUneOgaseuZj4kulngQPHSJ2PXE18ptvi\/BA1Yidj2QlbqLiY7gAcuIXQ98h+73f80MbhE8wCB2HfK1Eg8LXdPg3bt3T83Ozqrjx4+r9evX69e++OKL6urVqyvud4HgwSdi1yFZmWUlbnNFtr+XHTjhMuF9\/vnn6qefflLz8\/PqypUr6ujRo\/r+N998o7744gsdvy4QPPhC7HrSxopcFTqjafDefPNNNTk5qdasWaOmp6fv39+8ebPauHGjunXr1uCV\/hE8+EDsejTOitwkdIbLhBcKgoe2EbuejbIiu4TOIHjIHbHrycLDjw5uua3Io4TOIHjIGbHrkWvwxgmdQfCQq4mlN9LyOwnemZXVDt26n78b3Fq5YtvaCJ1t4t\/XB7fK\/8zQmGXAWxajYLILQN2E13boROwTHuCK2HniGpCy4PkInUHwkBNi58Go4aia8NoOnRFj8IBRsM\/OAxONYYvWPGeHrcjeh2dzDd6K\/XI1XxvjPjzABZOdR21MeDY7SHWKr637WiY8pI7JrmXFUBQXb5PJzhhlwnOJ2jBMeEgVk13AXCe84uPDwsaEh1wRO8\/GDUaT4Mlt+74Eqxi6FREjeMgQsWuRrzBUBa8YrmLkbFXPFcUWPPlcvldeeUX\/t8rl7bffHjwD\/InYRaJuH5\/EqUnMzGvqpjsRU\/BOnz6tPvroI3X27Fn17rvvqpMnT6pz584NngWIXatkh7652Pfb0uSghou64NnPt\/n\/4ZNMdBs2bFB3795Ve\/fuHTwKELuolB2dFU0mNWPFxFbydbGF7oUXXlBPPfWU+vbbb9Xhw4fVrl27Ovt0ZcSB2EWiKnRGW8GLLXRiampKffnll\/pj5F9++WX11VdfqVOnTg2eBYhd8CRyduh+\/++D9y\/DjBu8GEMn3nvvPf0LgsRrr72m1q1bp7Zt26bvA4LYBaBsais+Xgycr+CJmEInXn31VXXgwAH1+OOP64vclscAg9jVkP0+O3bs0Ecj5drXfiA7bGXT3DBlj7uwgydiC52QXw704Ycf6v92uchteQwwiF0FOXdLfqXg1q1b9dE9uZb78nhbitNb3TQ3zLDXuEx3Lq8FYkXsKty4cUNdu3ZN7\/uRKeHgwYPq0qVLam5ubvCKdjWd5oYZNXjDXhPDScSAqyhiZ\/92+kOHDunNyU2bNqnbt28PXrFyc1Mu9hn0Ei377Prnn39eP1Z31v3ly5fVwsKCmplZuZl3\/Xo7k1BxijNcImdz\/briPjp781WWB5CS4GMnQXvuuefUY489pjcljxw5ok8rsJnXmM3NM2fO6DPo5QidPLd79249kck5WHKRgMljx44da3TW\/b59+\/TKL9dtKQvduJoGrxg6g+AhVcHH7uuvv1Y\/\/PCD2rNnj96U3Llzp3r22WcHz\/7JvEY2M+U1Mv3JSiuTmnnu9ddf17\/dXi7y2+7lMYmhqDvrXmIo30+uuzDx9KK+jKpuk7YsdMawx4SZgH2QKXt2dnbVxF6mqwNHSEfwsTObjMVNSVvVZmXV10vkQjzrXmI16qZsFYlcXegM81yI010XB46QnuBjZyJVFbSqEFZ9fd1Z98WvrQqnKxO0YZc21H2fqtAV+ZzoDJnIL168qL7\/\/nv991Kl6wNHSEPwsXviiSfUI488os6fP69\/css+NXlj28xrJFTmNbJyymaqee6DDz7QK4lc5HXymGwuVZ11bzaZ5c\/+5Zdf9LXcl8djUBa8pqFzCaKoO5AkfzdlB4TkObMZK99HruXrzevl+5r9qb4PHCFNwcdOfsq\/\/\/77+if5mjVr9BtdNj1t8ppPP\/1ULS4u6tfIgYS33npLn0Evz124cEFHasuWLfoiUZPH5ABF1Vn3MjWcOHFCf1\/5PnIt9+XxWLlOdMMMe9wcJKo6kOT6MUyyX1V+CM3Pz6u1a9fe\/2Fm+DhwhHQFHzshBw3u3LmjV1RZQR58cPXEsn37dr1JKq+Ri0x1JkpyUMI+u\/6TTz7Rj8nzdWfd299XruV+zMoCZpPXNHmdrcmBJKPugJAh4ZS\/J\/kBNj09rX788Uf9NUbXB44Qt+BjZzaNzOaQXORN\/8wzz9Tu28EyiYJRFzITfxdN9mfG+jFMo8Qf4Qk+djJJvfPOO+rXX39VDz30kN4MffLJJ\/VjcOMSPGGi1yR8VQeCDPnh1MbHMPk8cFSF4MUtis3Yl1566f5mrFxkM5SpbjiX8\/NcVt666DU5kNTWxzB1feDI\/v8mePGKInZoTo7AmpOS7fDJSmpWVPsorevKa6JX\/Dr54VN3IKmtj2GSfYJdHzgiePHjl2R7IivEsEU7LDhtq5vuzJ9tv67tt4FMd\/v379f7V69cuZLMJG6HjlUnLkx2CaoKqf3cOBNeUS4HkuzAMeHFhdhlrq3g5XQgieDFic1YT2QlGLZozcpRNX21pbg5W\/Vn+tykTZUdOpZZ+JjsoLW5SZsLO3Ass\/ARu4TZAWsySRI8dwQvHsQOKxA8dwQvDuyz80Te9MMWrVkZmkxafWIfnjs7dCyz8DDZYSgmPHd24Fhm4SF2KEXw3BG8cBG7hFx9YE6t\/8cDehP00Mk9ascbM2rT4fXq9sb\/D17hjuC5I3hhInaJkKDVfXjmqAieO4IXHmKXCJcPzxwFwXNH8MJC7Dyx3+hd6OIz3QieO4IXDmKXiCYfntkGgueO4IWB2CWiyYdntoXguSN4\/SN2iZi6+bfaD89sE8FzR\/D6RewSsvev\/1R3\/vObDlHZb2FrE8FzR\/D6Q+wSYc6xM+fVrfjwzKWpzxeC547g9YPYJWL7bzt7+\/BMgueO4HWPDwLomHlj24FIBR8e4M4OHcvMLyY7tIYJzx0TXneI3Zhk35j8kpnZ2Vl9ykfuCJ47gtcNYofWETx3BM8\/YgcvCJ47gucXsWvJzZs31a5du\/SbVH5\/qvwLhtwRPHcEzx9i15KFhQV1+vRpNT8\/r9auXatOnTrFPrwlBM8dwfOD2LVEPkdu8+bN+p9qTU9P6xN65XPlQPBGQfDaR+zQCYLnjuC1i9ihMwTPHcFrD7FDpwieO4LXDmKHzhE8dwRvfPzb2I6ZN6q9wueKf0vrzg4dy8wNkx16w4TnjglvdMQOvSJ47gjeaIgdekfw3BE8d8QOQSB47gieG2KHYBA8dwSvOWKHoBA8dwSvGWKH4BA8dwSvHrFDkAieO4JXjdghWATPXQjBC\/XvitghaATPXd\/Bs\/\/8kBA7BI\/guasLno\/lGPrfDbFDFAieu7Lg+Vp+oU50BrFDNAieu2LwfEQvlr8LYoeoEDx3vieu0Cc6g9ghOgSvPeMsv9iWPbFDlAhec76WTywTnUHsEC2CV6\/JcnFddrEua2LnCStfNwheNR\/TV2wTnUHsED2CV03iVBeoJsst9mVL7JAEglevSfSqxDrRGcQOySB4zZRFr2yZpbIsiR2SQvCaazrpxT7RGcQOySF4buzo2csrtWVH7JAkgueuOOmlMtEZxA7JInijSXVZETskjeC5S22iM4gdkkfwmkl92RA7ZIHg1Ut1ojOIHbJB8PJG7JAVgrdSTsuA2CE7BG9Z6puuNmKHLOUevBz\/n4kdspVz8HKa6Axih6zlFrycN9uJHbKXU\/BynOgMYgcsST14OU90BrEDBlIOXs4TnUHsAEtqwWOiW0bsgIKUgsdEt4zYAUPEHjwmutWIHVAi5uAx0a1G7IAKsQWPia4csQNqxBQ8JrpyxA5oIPTgMdHVI3ZAQyEHj4muHrFD9q4+MKd2vDGjJp5e1Ndyv0xowWOia47YIWv3\/n5LHT16VG3dulXdvXtXX8t9ebxMSMFjomuO2CFrN27cUNeuXVPbtm1Tk5OT6uDBg+rSpUtqbq58uhN9B4+Jzh2xQ9YuX76sFhYW1MzMzOCRP12\/fn1wazXZ3JWLrev4MNG5I3bAkn379ulgyXWVYuQWHn50cKub4DHRjY7YtUjeiOZi30f4zp49q6cluS5jh04iZ0LXZfCY6EZH7ABHdtyMric8uCN2LeKnbnzMvjqzj85cF\/fhNeEreMSzHRNLKyhraIuKb8zi4jXP20fz0B85xWT\/\/v369scff6yOHDmib3\/22Wdq8n8b9G1hNmGHTXVF637+bnCLH4AhYbJD1iRoJ06cUIuLi2pqakpfy307dK7amvCY6NrFZOeB\/SZlskuDy2RnMOGFhcnOI97geRt1wmOi84PYAQ2YSdye1poYJXj8kPSD2HnAmxW2psFjovOL2HlC8GBrEjzeM34RO6ChUTdljbLgMdF1g9gBI2gzeEx03eDUk47xUxxFrILdYLIDekTousNkByALTHYAskDsAGSB2AHIArEDkAViByALxA5AFogdgCwQOwBZIHYAskDsAGSB2AHIArEDkAViByALxA5AFogdgCwQOwBZIHYAskDsAGRAqT8AbJX41xhrTScAAAAASUVORK5CYII=\" width=\"236\" \/><\/p>\n<p>(ii) &nbsp;&nbsp; If the time taken by the body to reach the bottom is t, then&nbsp;<\/p>\n<p>&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp; <img loading=\"lazy\" decoding=\"async\" alt=\"\" height=\"29\" src=\"blob:https:\/\/vault.kapdec.com\/d81a2053-c9d1-4e1f-9fb8-843a4bf31021\" width=\"84\" \/><\/p>\n<p>&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp; <img loading=\"lazy\" decoding=\"async\" alt=\"\" height=\"29\" src=\"data:image\/png;base64,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\" width=\"57\" \/><\/p>\n<p>But&nbsp;&nbsp;&nbsp; <img loading=\"lazy\" decoding=\"async\" alt=\"\" height=\"30\" src=\"blob:https:\/\/vault.kapdec.com\/c064aea7-e7ae-4f98-8020-16a30e9fe5b6\" width=\"47\" \/>&nbsp;or <img loading=\"lazy\" decoding=\"async\" alt=\"\" height=\"30\" src=\"blob:https:\/\/vault.kapdec.com\/4c72e60b-ebab-4c3e-bb0d-a4f92ff5129e\" width=\"41\" \/><\/p>\n<p>&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp; <img loading=\"lazy\" decoding=\"async\" alt=\"\" height=\"38\" src=\"blob:https:\/\/vault.kapdec.com\/adba0b20-247d-4b3b-adca-4efe2b3d7242\" width=\"72\" \/><\/p>\n<p>(iii)&nbsp;&nbsp;&nbsp; The velocity of the body at the bottom<\/p>\n<p>&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp; <img loading=\"lazy\" decoding=\"async\" alt=\"\" height=\"26\" src=\"blob:https:\/\/vault.kapdec.com\/214c30ed-3ef8-4e80-8df4-9060690b48d8\" width=\"116\" \/><\/p>\n<p>(iv)&nbsp; The velocity of a body moving on an inclined plane does not depend on the inclination of a plane but the time taken to reach the bottom of the plane depends on the inclination of the plane. The velocity and the time taken by the body on an inclined plane depend on the height.<\/p>\n<p>(v) &nbsp;&nbsp; When a body moves on an inclined plane. It traverses one-fourth of the length of the inclined. Plane in time interval 0 to t\/2 and the remaining three fourth in the time interval t\/2 to t.<\/p>\n<p>&nbsp;<\/p>\n<p><strong>Displacement &ndash; Time, Velocity- Time &amp; Acceleration &#8211; Time Graphs for Motion in one Dimension<\/strong><\/p>\n<p>&nbsp;<\/p>\n<p>(i)Variation of displacement (x), velocity (v) and acceleration (a) with respect to time for different types of motion.&nbsp;<\/p>\n<p>&nbsp;<\/p>\n<p><img loading=\"lazy\" decoding=\"async\" alt=\"\" height=\"113\" src=\"data:image\/png;base64,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\" width=\"451\" \/><\/p>\n<p>&nbsp;<\/p>\n<p><img loading=\"lazy\" decoding=\"async\" alt=\"\" height=\"272\" src=\"data:image\/png;base64,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\" width=\"451\" \/><\/p>\n<p>&nbsp;<\/p>\n<p><strong>(ii) &nbsp;&nbsp; Displacement calculation from Velocity &#8211; Time Graphs<\/strong><\/p>\n<p>The displacement during an interval between time t<sub>i<\/sub> and t<sub>f<\/sub> is the area bounded by the velocity curve and the two vertical lines t = t<sub>i<\/sub> and t = t<sub>f<\/sub>, as shown in figures (a) and (b).<\/p>\n<p><strong><img loading=\"lazy\" decoding=\"async\" alt=\"\" height=\"329\" src=\"data:image\/png;base64,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\" width=\"424\" \/><\/strong><\/p>\n<p>&nbsp;<\/p>\n<p><strong>(iii) Velocity calculation from Acceleration &#8211; time Graphs<\/strong><\/p>\n<p>Given an acceleration&ndash;versus&ndash;time graph, the change in velocity between t = t<sub>i<\/sub> and t = t<sub>f<\/sub> is the area bounded by the acceleration curve and the vertical lines t = t<sub>i<\/sub> and t = t<sub>f<\/sub><\/p>\n<p><img loading=\"lazy\" decoding=\"async\" alt=\"\" height=\"189\" src=\"data:image\/png;base64,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\" width=\"451\" \/><\/p>\n<p>&nbsp;<\/p>\n<p>&nbsp;<\/p>\n<p><strong>Example 1.<\/strong><\/p>\n<p>A ball is projected with a velocity of 20 m\/s vertically. Find the distance travelled in the first three seconds. (Use g = 10m\/sec<sup>2)<\/sup><\/p>\n<p><strong>Solution:<\/strong><strong>&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp; <\/strong><\/p>\n<p>The problem here is to find the distance. We can calculate that the direction of the ball is changed at t = 2s. (From v = u + at, since v = 0 at highest point therefore 0=20 &#8211; 10t &THORN; t = 2s)<\/p>\n<p>Distance travelled in first two seconds (<img loading=\"lazy\" decoding=\"async\" alt=\"\" height=\"9\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAsAAAAYCAYAAAAs7gcTAAAAAXNSR0IArs4c6QAAAGxlWElmTU0AKgAAAAgABAEaAAUAAAABAAAAPgEbAAUAAAABAAAARgEoAAMAAAABAAIAAIdpAAQAAAABAAAATgAAAAAAAACQAAAAAQAAAJAAAAABAAKgAgAEAAAAAQAAAAugAwAEAAAAAQAAABgAAAAAzNReUgAAAAlwSFlzAAAWJQAAFiUBSVIk8AAAAFdJREFUOBFjYBgF9AwBDqBlNkDMiGQpL5BticSHM6OBrP9ArAMXYWAogoqJIYmBmcxAUgNNkA3IV0UTI54LMhEdJAAFuIH4MboENv5FoGAvNolRsaEeAgBDwgaemwvwagAAAABJRU5ErkJggg==\" width=\"11\" \/>&nbsp;Distance = Displacement, &nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp; because velocity does not change direction in one dimension)<\/p>\n<p>&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp; <img loading=\"lazy\" decoding=\"async\" alt=\"\" height=\"21\" src=\"data:image\/png;base64,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\" width=\"126\" \/><\/p>\n<p>&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp; = 40 &ndash; 20 = 20 m (upward)<\/p>\n<p>&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp; Distance travelled in the next second<\/p>\n<p>&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp; <img loading=\"lazy\" decoding=\"async\" alt=\"\" height=\"21\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAALIAAAAeCAYAAACIVET9AAAAAXNSR0IArs4c6QAAAGxlWElmTU0AKgAAAAgABAEaAAUAAAABAAAAPgEbAAUAAAABAAAARgEoAAMAAAABAAIAAIdpAAQAAAABAAAATgAAAAAAAACQAAAAAQAAAJAAAAABAAKgAgAEAAAAAQAAALKgAwAEAAAAAQAAAB4AAAAAoVxPQAAAAAlwSFlzAAAWJQAAFiUBSVIk8AAABkNJREFUeAHtmmmIVlUYgJ0cNTO3VjKXsdQ0KpQwsqIFSxQXihKzDSsqi7SMth\/aaJgtkBn+MDVjQoqKiIpUyiyxpMCljdTKXMoMWwwKkjKy55nugevlu998M87yjZwXHs971vc97z3bp1a0adPmAMyEKDECrTUC1To+q4y974Zvj8PQMvYxutbyEag+ouV9yPWgBzVPwGjomtsqVsQIEIFyXsi78e9W2Ao+f6LECORGoJwXcq7TsSJGIBuBykxBT\/InwU74KVPXktmKIsb1+VfYl2nThXxf2Ax\/Z+oams2z1dDxSumnzQ5Jw2NI\/d2wMsk3JDmLTpfDRnirIQOUUZ8wlwH65I89g7MaamAu\/AunQ0vLIzjwM6yAURlnOpLXdxfwoEzdOPKfwdOwE\/rBoUgxW4cybil9N9HIjfhXwgOldCrSpoK69XBHkTatpSrMpXZDuhimwrKU90vQ26by5aY6gTfhPvD93B+C+FzaAcOTgtdJn030dOIir0oXoN8MYzJlxWxlmjZJ1oV8XCOO7Hy8wYY04pgtNVSYywIdmAWPwpfQCeojR9L4jCK0r89gDWjbhT4u5PSJ601iWWdQ7oUttdrBf9xDdjtUJcW3kG6DPkk+mxSylW7TVLHIW8jnYvx9mAzeQOpu7HPAG2whBPE7eJK7qZfDHxAOKtPpEDa8sbwLVkFoswjdcb2ZXoY5MAxWg\/bd\/ME+akn9bZf26xXy4akTxr6NsrEQ5ol6UJ8wl5lWuJD7wh5YBydDqeJJ+F4Repc6UAPbFVpclzKWT6Mgk1D2hkwmnUp+O8yAnWAc8qSQrXTbporF5xjxQ26A+eBiUu6GafA9PAhXg88PT6fBcAC6g+LtUwOV8BS4SIPUoLwI7aAa3AC9wP4nQDfYDzeA4vt8CqTt228C7AKllP62S\/vlYbrGQsSx3Uw\/wEy4Ey4EJd0nzEX7tQvZ1B8VLuTNEHYiaqPKmYzmmzePfilrBjJLqrpWLbS4RiT9wt\/IXEN+d7ZjKu9JoJ3LUmWF1EK2CrUrtazUWGjXuRwP3przIMiTKKuTzETSH+EoGAy\/gdIHfGPbX3keZtdq\/99G\/6CfkuSnka4F7Vk+CDzlt8P9cGyih82k\/Q9AuR6CXkr\/rF9L6O9iDjIXZU3IJGm2T5hLdWWq4S708aDT7ijFna54bU4Br6S0uPDcwXlyIxXfpSq\/QA8BTRUXVCsKltZd6M2iaEfd4OctZK9Fr0w\/7GK4GHZAQ6SpYvF74oyb36v3gpRz56Prt+JT4zX4Ey6CD0FxflvB\/n7HkeB3URzLU2+bGWQIbAJvNGPXH3w2PAcnwmPwEOwDJW1fm2Ehl9Jfv74B\/XLzXQnXQhDH9kmTlry5DLXRV2ADZTjsBXeUu9pdrqwEF3lWDIwnSx7tsx0aOe9iPQCDUuO2RfdkCr6\/ij4jVR\/UySjfQlVS4HXmJu6d5LNJIVvpNk0Ri74YWAxhU69AfyYx2pHUk3Zgkl9Hel2iLyV1zufBJPgElDlgvE4Fv+9ocOEqPcAFerYZxPGMzwi4Cb6G5RAka\/9TKq6AYUmDuvpPol3wy5M97Vd27GTI3LkssMEe2AFesRvhEkhLNzJOwqCWk9yOMx+BAdgA\/qgLMhbFDfoSLIOjISsLKeiVKfQH4LhMmdlitgo0b7QiY+4CeQfeBQ8UN5Tiaeqh4yJ3E+2H00CZB9tgOvQEN6ixcm67Et0F60HjmC+Ai8oFG+QNFOOnjIJfwMUeJG3fslWwGSaYQerqH\/xyzQW\/PkbXr+zYFNVK6JOdS+3mnkWTjuCCzYrlb8PIbEUz5KuwoYNSA52hPuIH9so6HKQDk5D6iN8uSCVK2yTjojc2aemUziR6V9Jgsx26+WKiDdsFKaV\/XX6FsdJpoT7VNnAhFxIn67U8BlxEA6E5ZTDGJiYGPTXGN6fxaKtVReCgH3tZz6+iwDfUAOgOs2ELNJd4pYo3RR9YD1FiBHIjkHci53ZoxoqWfNo04zSjqUOMQFn\/f2SfNkthPqyF5n7aYDJKa4mAD+dylZZ+2pRrXKJfBSLgqedfXz1coC4WxQi0lgj4jzRRYgRiBGIEYgRiBGIEYgRiBGIEYgRiBGIEYgRiBGIEYgRiBGIEYgRiBGIEYgRiBA7vCPwH4\/hn5Mjr3NUAAAAASUVORK5CYII=\" width=\"178\" \/><\/p>\n<p>&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp; So total distance travelled by the ball in the first three seconds<\/p>\n<p>&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp; = 20 +5 = 25m<\/p>\n<p>&nbsp;<\/p>\n<h2><strong>Key Points:<\/strong><\/h2>\n<ul>\n<li>Following are the three equations of motion for an object with constant acceleration.&nbsp;<\/li>\n<\/ul>\n<p>&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp; (a) <img loading=\"lazy\" decoding=\"async\" alt=\"\" height=\"23\" src=\"blob:https:\/\/vault.kapdec.com\/0fa08ad1-21b0-4339-8556-99a8b4ced44e\" width=\"56\" \/>&nbsp;<\/p>\n<p>&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp; (b) <img loading=\"lazy\" decoding=\"async\" alt=\"\" height=\"29\" src=\"blob:https:\/\/vault.kapdec.com\/3ee34131-34d1-4b1f-8f5d-cca31a8796dc\" width=\"72\" \/><\/p>\n<p>&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp; (c) <img loading=\"lazy\" decoding=\"async\" alt=\"\" height=\"23\" src=\"blob:https:\/\/vault.kapdec.com\/1f6dff09-7b15-4f6b-8eab-3ec36a5b91cc\" width=\"74\" \/><\/p>\n<p>&nbsp;<\/p>\n<ul>\n<li>The velocity of a body moving on an inclined plane does not depend on the inclination of a plane but the time taken to reach the bottom of the plane depends on the inclination of the plane. The velocity and the time taken by the body on an inclined plane depend on the height.<\/li>\n<\/ul>\n<ul>\n<li>When a body moves on an inclined plane. It traverses one-fourth of the length of the inclined. Plane in time interval 0 to t\/2 and the remaining three fourth in the time interval t\/2 to t.<\/li>\n<\/ul>\n<p>&nbsp;<\/p>\n<p>&nbsp;<\/p>\n<p>&nbsp;<\/p>\n<p>&nbsp;<\/p>\n<p>&nbsp;<\/p>\n<p>&nbsp;<\/p>\n","protected":false},"excerpt":{"rendered":"<p>Kinematics |&nbsp;Representation \/ Equations of Motion Reference: AP Physics Algebra, Kinematics, Equations of Motion, Equation of motion on an inclined plane, Displacement &ndash; Time, Velocity- Time &amp; Acceleration &#8211; Time Graphs for Motion in one Dimension &nbsp; After studying this chapter, you should be able to, derive equations of motion with constant acceleration; describe motion [&hellip;]<\/p>\n","protected":false},"author":1,"featured_media":0,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"footnotes":""},"categories":[622],"tags":[],"class_list":["post-9479","post","type-post","status-publish","format-standard","hentry","category-ap-physics-1"],"_links":{"self":[{"href":"https:\/\/kapdec.com\/help\/wp-json\/wp\/v2\/posts\/9479","targetHints":{"allow":["GET"]}}],"collection":[{"href":"https:\/\/kapdec.com\/help\/wp-json\/wp\/v2\/posts"}],"about":[{"href":"https:\/\/kapdec.com\/help\/wp-json\/wp\/v2\/types\/post"}],"author":[{"embeddable":true,"href":"https:\/\/kapdec.com\/help\/wp-json\/wp\/v2\/users\/1"}],"replies":[{"embeddable":true,"href":"https:\/\/kapdec.com\/help\/wp-json\/wp\/v2\/comments?post=9479"}],"version-history":[{"count":0,"href":"https:\/\/kapdec.com\/help\/wp-json\/wp\/v2\/posts\/9479\/revisions"}],"wp:attachment":[{"href":"https:\/\/kapdec.com\/help\/wp-json\/wp\/v2\/media?parent=9479"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/kapdec.com\/help\/wp-json\/wp\/v2\/categories?post=9479"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/kapdec.com\/help\/wp-json\/wp\/v2\/tags?post=9479"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}