{"id":326969,"date":"2023-01-05T23:55:40","date_gmt":"2023-01-05T18:25:40","guid":{"rendered":"https:\/\/infinitylearn.com\/surge\/question\/a-force-f-acting-on-an-object-varies-with-distance-r-as-shown-here-the-force-is-in-newton-and-x-in-metre-the-work-done-by-the-force-in-moving-the-object-from-x-0-to-x-6-m-is\/"},"modified":"2025-06-26T18:00:34","modified_gmt":"2025-06-26T12:30:34","slug":"a-force-f-acting-on-an-object-varies-with-distance-r-as-shown-here-the-force-is-in-newton-and-x-in-metre-the-work-done-by-the-force-in-moving-the-object-from-x-0-to-x-6-m-is","status":"publish","type":"questions","link":"https:\/\/infinitylearn.com\/surge\/question\/physics\/a-force-f-acting-on-an-object-varies-with-distance-r-as-show\/","title":{"rendered":"A force F acting on an object varies with distance r as shown here. The force is in newton and x in metre. The work done by the force in moving the object from x = 0 to x = 6 m is"},"content":{"rendered":"","protected":false},"author":1,"template":"","meta":{"_yoast_wpseo_focuskw":"","_yoast_wpseo_title":"","_yoast_wpseo_metadesc":"A force F acting on an object varies with distance r as shown here. The force is in newton and x in metre. The work done by the force in moving the object from x = 0 to x = 6 m is","custom_permalink":"question\/physics\/a-force-f-acting-on-an-object-varies-with-distance-r-as-show\/"},"categories":[],"acf":{"question":"<p>A force F acting on an object varies with distance r as shown here. The force is in newton and x in metre. The work done by the force in moving the object from x = 0 to x = 6 m is<\/p><figure class=\"image\"><img 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muIqBVN5oO\/NGV+WWP1DwxwaKwti526L22amkWUagvPydro8leEKl4XT0aHVskqxPU0AdxM1bz\/UkOGtHvUdmjFcdPVUOtrokfJ3YkUf\/++LeUdCMYJUIsJhyDgTfce2Lb91qrosnIH4Tbos3KK+6XJ31M3ch1se13WauieWXiO\/L79AO1d19h87t1hfxsrazPSeiH8lmx7S3R1+Gmi8qqKueWx4k9kSvtq7ootn0urf+jR4gFWkjU2hEftuabtmppQtWGizLdVx6e7EKajfzefEINBbLD+GNZVfyirpFGUDG\/ayvkea02iki7Ozy2PVsNfpAe7sJA0\/+6lNDnqqYqo6x8y1YtrYwQC7SIiqvKjYsS2hK0l4qvOOPMMFLXyM8XJ7U1NvpjWf7gc1GSvwofwdKKfdMFyrTG\/ibaN+MPm6vr4wH3Lnl+35DgDwXxD9SmdXqNGny+TGut6YbBc1UbrbANQIgFWkAUYE2Lx0sDscubXtKG1hqOmb1rVvkPQRRqP6qGvuLckMSWoOj35rFol9+Z4b10caUoVQkV5fGHb1JDz6l5PZ4iS9L7F1ebPdCMa\/11FRsnVvFc7Rb1v6YVtgEIsUCTiwKZaYGNzyR0nL2Kmk9l4IjC6tny3D2thlqDzFBSSeufHZ9WtlqfRUTq\/YBjWrIrxj59n0p2MDu31sVbVcaJTfpzVRa\/rmE1rbBjR4gFmlgUYOPjVe4OsLzp1c1c7VsOsaYP40FJ6YIRzVhWbu05M2mt0BPs9th20ieKGKkVkedqb2fFtr9uq4h2QIgFmlSVYaIIsKMUjUds+jaWg+w8WRIRYtVQ65exUp6HWq3Q8a81vyDn\/T7aXsPwSNVFv1fm9bg7lJluGwl6XT4u0pGcAAADJUlEQVQe3xnpv7vyuUq6qGGi\/K1aHx8ux4cQCzSh6Gry+EUTJohdmqA\/lI20xXYBTaDayA3VxIPGQxNRSBsph\/0Rg1yb+c3Ip+zl9yOfkhinxrbX2CqiXRBigSZTZZpe0+fsWlv1NJvYeLD1jkH8+gksB20gah0rT7\/7WJ0XwNX7waDd7DEdb52t0El9rqqJX8\/wPWtVtAlCLNBEqgTYalf9Jt2Bauhr3JOHe36iq\/PjFzRtm+DamslhI5+ymxmovtwCay7CCaLtJD1X5r+1HLRM3+kvDhfMopm8ytZOZGHNpkr3gHfLUvNDdjTEW1miZxiM3o9e+raDrgTjR4gFmkR0IU48wCZuSKg6mSGOyn8IVsvz9vAwgSM+L\/mI87y3k3rHg431gTWCJI4jWyWYfUiWqq2xURD5WuzQmomtril9VQ09V2Yc5vXV3qtis3mV3TQZxTWx+KxwifrwM1EIsUATiMYNjF+IQ4CtzXQnuCbaNhdI3CvP32nxgBo9n5erPVthz5u8EtGCzLcg5WBmppY16z1aZKNWxRvVnhfmJPGbktsr9s2MXIfFPwBFr8Gb1Z79rJM+Hmp8tjP6nDcAIRZoDudX7P979Ee0Hh9PUuA1YVWem+VqaOQG80dyWzRHe17FuhvErE5iCyPqZ8Ko\/A5dp4Y++JgLK02YLbeY9aqh8Fp24mTV10yiluvFsrkhdvix6D3LPF\/VXoPLE3YBXDULYtsFW0W0E0Is0Bwq52ofzYUQV4x8SnuJAkc8yBo9au+QYVzETFWok2mtn6P2fP3Vei0uTtKHx0pmGucqr0Gj2vNF3\/5Bh8S2n7VWRRshxAKWVVz4gDpFQdZcvPRPqvpsVKZV7Su0wKJeUUvhymiMZjOsXbUPReb4VUnqX11L9Bo0Yy+bb5IqP4gbvAZrS9KFkxOGEAub6r16ut2ZIWvG81yURj6lPUV\/HM9Wg1PMHlpxHPX5uBpqzU\/s71Jc1Gp4R3RhUvlinGeT3PJaSxTmLzRLNFTZrOhHJboP7OWl1xofghqDEAtrCBqDojd6notx4vdpbAhmtfHaHB1+l4bH89N4\/w9oYUF+lVTmIwAAAABJRU5ErkJggg==\"><\/figure>","options":[{"option":"<p>4.5 J<\/p>","correct":false},{"option":"<p>13.5 J<\/p>","correct":true},{"option":"<p>9.0 J<\/p>","correct":false},{"option":"<p>18.0 J<\/p>","correct":false}],"solution":"<p>Work done = Area enclosed by F-x graph<\/p><p>&nbsp; &nbsp; &nbsp; &nbsp; &nbsp; &nbsp; &nbsp; &nbsp; =&nbsp;<math xmlns=\"http:\/\/www.w3.org\/1998\/Math\/MathML\"><mo>=<\/mo><mfrac><mn>1<\/mn><mn>2<\/mn><\/mfrac><mo>\u00d7<\/mo><mo>(<\/mo><mn>3<\/mn><mo>+<\/mo><mn>6<\/mn><mo>)<\/mo><mo>\u00d7<\/mo><mn>3<\/mn><mo>=<\/mo><mn>13.5<\/mn><mi mathvariant=\"normal\">J<\/mi><\/math><\/p>","subject":""},"yoast_head":"<!-- This site is optimized with the Yoast SEO plugin v17.9 - https:\/\/yoast.com\/wordpress\/plugins\/seo\/ -->\n<title>A force F acting on an object varies with distance r as shown here. 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