[br]In previous lessons, you learned how to change [color=#0000ff]FRACTIONS[/color] to [color=#0000ff]DECIMALS[/color] and vice versa, and how to change [color=#0000ff]DECIMALS[/color] to [color=#0000ff]PERCENTS[/color] and vice versa.[br][br][color=#0000ff][i]Getting to the Point:[/i][/color] https://www.geogebra.org/m/wz32mw3y[br][color=#0000ff][i]Missing the Point:[/i][/color] https://www.geogebra.org/m/vjjpprfm[br][color=#0000ff][i]Hurdling the Bar:[/i][/color] https://www.geogebra.org/m/ncnyduqx[br][color=#0000ff][i]Pointing Left or Right:[/i][/color] https://www.geogebra.org/m/ey2tthc4[br][br]In this lesson, you're going to learn how to change [color=#0000ff]FRACTIONS[/color] to [color=#0000ff]PERCENTS[/color] and vice versa.[br][br]In previous conversions, you only needed one step to do your conversions. Here, however, you cannot do the conversion directly; you need an intermediate step, a stepping stone.[br][br][br]To change [color=#0000ff]FRACTIONS[/color] to [color=#0000ff]PERCENTS[/color], follow these simple steps:[br][br]Step 1. Change the fraction to decimal.[br][br]Step 2. Change the decimal to percent.[br][br]Examples:[br][br][img]data:image/png;base64,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[/img][br][br][img]data:image/png;base64,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[/img][br][br][br]To change [color=#0000ff]PERCENTS[/color] to [color=#0000ff]FRACTIONS[/color], follow these simple steps:[br][br]Step 1. Change the percent to decimal.[br][br]Step 2. Change the decimal to fraction.[br][br]Examples:[br][br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAALYAAAA7CAYAAADW3nACAAAK/ElEQVR4Ae1dv4+kyBVmZ/f2fLYsnWVLtmRLtuTICf8D+w9w+RETk60I3VlbWsk4wsmiXV1H7WA76mTxyh1xAcF10g76dB24EwJGRisRcN7PqoIqiobugW6aYUY1Emp+FNR7X31UvXrvUaNA/kkEHiECyiPUSaokEYAktiTBo0RAEvtRNqtUShJbcuBRIiCJ/SibVSoliS058CgRkMR+lM0qlZLEfnQcyJAkCd2yh6RblhZyp71ILYndC4xjeEiKlWdDVZ5AURS6Pb3R4frbMQh3XIZkC29icpmp7JqJ5SY5fk+LK5LYLUAaf5EM/kTj5DBtG6au8mM3jMepQhzAUJ7mcqo6LNPgMpOXMoj/d7bckthnQzeiG5MQunIDQgZ/zwyQDMuC7No0GJGwpShrV8+JbHiIitPpbgFNuaHnneD8F1ISu8T54e4VxP7Jcxs7QYuNl/eAuhMKZ8ezGzr5KOOuRbs6gaf/Jif2BSONJPZ42vl8SdI1H9JV08Uu/YT433Pe83nry+zV8wU7fWe8WWJi/x3b9JNQcAdb+awg9n+F8912JbG74TXa0jvfyYf1YuLIJpB//ZfYh49WfC7Ydm5RPQ5HH16g5Y4kdkugxl9sB0t5ViO3++1+/KIXEqbbOffqXGJfk8dJYj+YZj8haLLmpNYsD0GwgKX+jJPcmm9O3DyOS9kPS246md76YqEksS+G8P4fwLwLqjVHOQ2LMbfzydmTFw7O9y9cXz9CauLVIebTV9MVmF/nkpolsS9BbxT3ll4Ee1k1O9K1S8lyo7kY5/QRSDblJNdw+iE1aZaTxM7SPDSbpH28Q1dmQZYgJqHkODnrjWdh6Da6jg0XFpyp9tjAppiIjZXYUehxm1qdLHGbpojjWNjK8acrexqJne5WsI0ykkWGCN1ysU1Kt0yy9WEbOjRNw2R2zE+6w0RTcV13UwLfyWfSzBNAAhVey0lTsl3C0n7B7VGqq+2BxzkERNvgIhQfbDcO856Z6q+ZmLoO7K/LyON0xcIfg4nUoqIErvarCu6s/djvzY2GQOBci4fyIjViZ/vSiFc0ExNbiOPrbm6rFQEBbTLHt8vczWQt6m6lYKriuTrlUSVea287ETzjdxwcw7Sgq1/w4z8v6zKJVVcI8cKAZRaRMEXBM3WCH4SBqhUu4sMH3t/+0+WTL0aMJ6rR+gUfWFxa3W5h87ZiMou/qjk724SqETt08sbVpj4f0tmMlcbvk0+I/AkVyNuQlt/kwQFTnLgASWHfLZu6vp5Q3M7zl47ItdyxYSuCZ+a91eefWZVIXKXabMs9CfrU55MuMjwycMWXtQ0uleffy0GKaL/Hfr9HFI3Vqh4GmBqx124ehq1MRLI8skUIFCafwBrZpJOVlIZAiR3HZ97ZFqbyFMbsmm6mCH/RfklJWJGV4JYEfJbtHom6Raspvfenn0/wnwOsmX6K7vEeow0uB4+Rh/eIQI3YLL/gyRMVLo1aEbdRMUQXDb2Z5T2lE5JeMg+Bii4lf/InVIh+DQWFxJ+6HVZ6Co7Zl4y8mlNPEGKjjWhGtcHlGmrKZ56HQI3YyHZw9F/z4ZgNy4rucJsz283pdTpUpwG17dTJikqQhA7IS+FHbVIOIyxcB45zapvib98E3FRgajLyiS8Uu0Z+wyJzTGtMACqJ3xjhanppWuAi1h+tF5hOT+nl0OurPTOhxLvHt//Q9KkTG8B+IUwYWe6BUfUUBK5QRpvkiSxZbm+b8zy5PYu28JdL+KuwNFPENks3eYRMVaEe20jivFGaBOx2RmxFb/bRMtOhObMtgVu8vE5TBlka0nkDm1OwOtvgwsqynIejeqn5POC6HiMmzeW/D02fGrHXs9x1Rlwtnh9g6ZauNDIZ2wiZWFkSI4riYpKZYWn9Edwu3S9zH6Vu0B6d9Kx9Op3uIjbz7VrFS1Zt2pLYjTZ45FOZib7bLHdxdsGlWlf3o7dv3+Lly5f3ut3e3nYX/Mgdr1696l2X169fH6ktP10ldponrBNT4h/fl0Nk/F0ZHWrs4QDEwZSaICv61UOGpa3SxHca9S88JE33ZmmK9K4tE/xuhTrpJvdeiOQrNY3hFBNLJ2xKfUwwK9yETcSPg9yFyQMbZ+GS3a1XmnLPUyk78OHDB7x58+Zet48fP4oiAThfn3fv3vWuy/v37w/kqx5WiM16QeLDrXoKUu5MbyIn0jX1Qljcb5w739lziN1NbPWaWZCGNd8rt+mZCaQo+PkXDbkOhblAynub8iWk6kU+HS3IqONH9ZeClGGmimLMavb7qvjyRJ349HHn4LJ2qwGuJr3IuekFX4lUm/K6Rw9NnwqxURDisMcGsYWLlMh6D5hhYf4BVYI0E7s+kUuxWfnwVyusjm4+VuGuoWdLea+rEBu/MBmACK7x23zyK5A2S0WzCWA9PiGXGMiJgjKK9w17Yc7AJd2v4fv+Cb1W8P0Vdknzi3ddmnZ/+kPTp0psxHxSRRr8a3sKZ1p++dxkJ5NgTT30WZoiYfYJPxamyMSvJul0h7d6R7KZld4b8jGobcN48SU9RyZ+5fd/gheEmyYJZubv+f26acG2yo9JxQAVzsClKqk8GhqBA2IDSLdwrTK0zIZQw57V8yduV3TIt5sIW0zAVMOk5gbxCVfNm35UJfY/S3lksiq6jaBigjQRm9QfYz4pyczut2dBfYTogks/qsmnXIBAndjFw7IkoqHZ/T5CInhCxLqyKMR8EdZsVFbmx3gLfzHHYhkivuqIm4eSo4iEk3n8k4lBf4kpstszD07lEtI4wj6KaDg6PqIru6MNLqxsf79k4lYmoB19bpcMxy5lj1Z45oU2i+NkGdIsQ1bZUjT4ERqFOErsxtLy5LAIZDHW/gym9iWePzOxPkruLhmOXcr2rG6HxXHYxxNsFGW/1OXM51PH5ZPEPo7NPV5JsZhUzcHDYFEpXJcMxy5lyxp62eu4OA73WgneMUpulmF6h1CS2HcAdD+XM/hTE5qm4ystj1CyBLRDebpkOHYpe1jPpce8B261OE5C05Hpy3zmalCS2Je22LXvP8isrFbXJcOxS9lqLX0cdVscJ48ME2KvW5gdTfJJYjehMqZzSZm3QlKGK39NyVq8QOkJohmOXcryZ/S3021xnFJ2zbAwdTysNt0SMiSx+2u76zxJSMg6JDaLiLbJcOxS9jqK1J/KEqtqi+MUKQxswsh+VWvWOt9IEruO97jOtCB2mwxHRuw2ZYcA4PTiOAm+X4cIVkt4U7uSdtH24xVJ7CFa8ZI6LiC2mOF4F7HFspeI2+Ze9qkh6YnbLY5DvDn5JLrtByyS2G1a4j7LnCA2y3dpk+HYpew11T13cRwm/zGz61BmSexDRMZ2LEwea5/AFaQnPd+dGY5dyl4Jg0sWx1lNc7++ai3r6Q4N8kpiN4AyqlOiu68WeeyS4dilbP8InL04ThYjmJXLNIgrB5ySUhL7FDr3eC3ZBfCcCQzhX26omg7DdCrrSbfPcCTLibXNhuxb8Q6L4yRbzFwXHln0R8i2JKMSWSajbcqRJHbfbdjT83ik7iCk3BSBbJfhmAvWpWxPqtDHtF4cR1g6g7v5dBNex38SJYndZ+vd67PuznAsxetStrxrsL004Zml8ZkfYkhiD9ZasqIhEZDEHhJtWddgCEhiDwa1rGhIBCSxh0Rb1jUYApLYg0EtKxoSAUnsIdGWdQ2GgCT2YFDLioZEQBJ7SLRlXYMhIIk9GNSyoiERkMQeEm1Z12AISGIPBrWsaEgE/g9DB7fKWgenXQAAAABJRU5ErkJggg==[/img][br][br][img]data:image/png;base64,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[/img][br][br][br]If the percent involves a repeating decimal, just use the fraction (change to improper fraction if it's a mixed number) and multiply by[sub][img]data:image/png;base64,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[/img].[br][br][/sub]Example:[br][br][img]data:image/png;base64,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[/img][br]

Below is a set of problems involving changing fractions to percents and vice versa.

In future lessons, you'll learn about other relationships among parts and wholes. Did you have FUN today?