Verken de knoppen [img]https://wiki.geogebra.org/uploads/thumb/4/46/Notes-ruler.svg/24px-Notes-ruler.svg.png[/img] [i]meetlat [/i][img]https://wiki.geogebra.org/uploads/thumb/a/a3/Notes-protractor.svg/24px-Notes-protractor.svg.png[/img] [i]gradenboog [/i]of [img]data:image/png;base64,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[/img][i]geodriehoek [/i]en leer hoe je afstanden en hoeken kunt meten. Leer ook hoe je lijnen kunt creëren om teksten of objecten te onderlijnen.

[table][tr][td][img]https://wiki.geogebra.org/uploads/thumb/0/01/Notes-freeform.svg/24px-Notes-freeform.svg.png[/img] [/td][td]Selecteer de knop [i]Vrije vorm [/i]en teken een veelhoek.[br][b]Tip: [/b]Selecteer opnieuw het eerste punt om de veelhoek te sluiten.[/td][/tr][tr][td][img]https://wiki.geogebra.org/uploads/thumb/4/46/Notes-ruler.svg/24px-Notes-ruler.svg.png[/img][/td][td]Selecteer de knop [i]meetlat[/i] en toon een meetlat op het canvas.[br][b]Opmerking:[/b] met de meetlat verschijnt ook een [i]Omschrijvende rechthoek [/i]rond de meetlat.[/td][/tr][tr][td][img]https://wiki.geogebra.org/uploads/b/bb/Notes-bounding_box.png[/img][/td][td]Gebruik de handgrepen van de [i]Omschrijvende rechthoek[/i] om de afmetingen van de meetlat te wijzigen.[/td][/tr][tr][td][/td][td]Roteer en verplaats de meetlat op het canvas om de lengtes van de zijden van de veelhoek te meten.[/td][/tr][tr][td][img]https://wiki.geogebra.org/uploads/thumb/4/46/Notes-ruler.svg/24px-Notes-ruler.svg.png[/img][/td][td]Selecteer opnieuw de knop [i]meetlat [/i]om de knop te deactiveren.[/td][/tr][tr][td][img]https://wiki.geogebra.org/uploads/thumb/a/a3/Notes-protractor.svg/24px-Notes-protractor.svg.png[/img]of [img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAABcAAAAXCAYAAADgKtSgAAAKpWlDQ1BJQ0MgUHJvZmlsZQAASImVlgdUU0kXx+e99JAQIPQaepPeAkgJPXTpICohCRBKCIGgYkcWV2BFEZGmrOiqiIKrUmQVFQsWRMCCfUEWAXVdLIiKyj7gEHb3a+e758yb37nvzn/unTNzzgWATGIJBKmwFABp/CxhiLcbLSo6hoYbBXgAASmgCqxY7EwBIzjYHyA2P//dPtxDYhG7bTKj9a///6tJc7iZbACgYITjOZnsNIRPIeM5WyDMAgBVjfi1V2YJZvg8wrJCJEGE78xw4hyPznD8HH+ZjQkLcQcAjVSFJ7FYwkQASKqIn5bNTkR0SIsRNudzeHyEZ/J1TktL5yB8FGEDJEaA8Iw+Pf4vOol/04wXa7JYiWKeq2XW8B68TEEqa/X/eRz/29JSRfN76CGDlCT0CUFmSeTM7qek+4mZHx8YNM88zmz8LCeJfMLnmZ3pHjPPHJaHn3htaqD/PCfwvJhinSxm2DxzMz1D51mYHiLeK0HozphnlnBhX1FKuNifxGWK9XOSwiLnOZsXETjPmSmhfgsx7mK/UBQizp/L93Zb2NdLXHta5l/q5THFa7OSwnzEtbMW8ufyGQuamVHi3DhcD8+FmHBxvCDLTbyXIDVYHM9N9Rb7M7NDxWuzkAu5sDZYfIbJLN/geQbhwApYg2BgCbyBBQBZ3FVZM0W4pwtWC3mJSVk0BvK6uDQmn226iGZpbmkNwMxbnbsK70Jm3yAk377gSz+AXOEPyJvYseCLLwWgJR8AxYcLPp29AFDyAGjuYIuE2XM+9MwHA4iAAmSBElAH2sAAmCC52QJH4Ao8gS8IAmEgGiwHbJAE0oAQrARrwSaQDwrBdrALVIIasB8cBsfACdACzoAL4Aq4AXrAXfAIDIBh8BKMgw9gCoIgHESGqJASpAHpQsaQJUSHnCFPyB8KgaKhOCgR4kMiaC20GSqESqBKaB9UB/0MnYYuQNegXugBNAiNQW+hzzAKJsGysBqsB5vBdJgB+8Fh8DI4Ec6Ac+A8eBtcDtfCR+Fm+AJ8A74LD8Av4QkUQEmg5FGaKBMUHeWOCkLFoBJQQtR6VAGqDFWLakC1oTpRt1EDqFeoT2gsmoqmoU3QjmgfdDiajc5Ar0cXoSvRh9HN6Evo2+hB9Dj6G4aMUcUYYxwwTEwUJhGzEpOPKcMcxDRhLmPuYoYxH7BYrDxWH2uH9cFGY5Oxa7BF2D3YRux5bC92CDuBw+GUcMY4J1wQjoXLwuXjKnBHcedwfbhh3Ee8BF4Db4n3wsfg+fhcfBn+CL4d34cfwU8RpAi6BAdCEIFDWE0oJhwgtBFuEYYJU0Rpoj7RiRhGTCZuIpYTG4iXiY+J7yQkJLQk7CWWSPAkNkqUSxyXuCoxKPGJJEMyIrmTYkki0jbSIdJ50gPSOzKZrEd2JceQs8jbyHXki+Sn5I+SVElTSaYkR3KDZJVks2Sf5GsKgaJLYVCWU3IoZZSTlFuUV1IEKT0pdymW1HqpKqnTUv1SE9JUaQvpIOk06SLpI9LXpEdlcDJ6Mp4yHJk8mf0yF2WGqCiqNtWdyqZuph6gXqYOy2Jl9WWZssmyhbLHZLtlx+Vk5KzlIuRWyVXJnZUbkEfJ68kz5VPli+VPyN+T/6ygpsBQ4CpsVWhQ6FOYVFRRdFXkKhYoNireVfysRFPyVEpR2qHUovREGa1spLxEeaXyXuXLyq9UZFUcVdgqBSonVB6qwqpGqiGqa1T3q3apTqipq3mrCdQq1C6qvVKXV3dVT1YvVW9XH9Ogajhr8DRKNc5pvKDJ0Ri0VFo57RJtXFNV00dTpLlPs1tzSktfK1wrV6tR64k2UZuunaBdqt2hPa6joROgs1anXuehLkGXrpuku1u3U3dST18vUm+LXoveqL6iPlM/R79e/7EB2cDFIMOg1uCOIdaQbphiuMewxwg2sjFKMqoyumUMG9sa84z3GPcuwiyyX8RfVLuo34RkwjDJNqk3GTSVN/U3zTVtMX1tpmMWY7bDrNPsm7mNear5AfNHFjIWvha5Fm0Wby2NLNmWVZZ3rMhWXlYbrFqt3lgbW3Ot91rft6HaBNhssemw+WprZyu0bbAds9Oxi7Ortuuny9KD6UX0q/YYezf7DfZn7D852DpkOZxw+MPRxDHF8Yjj6GL9xdzFBxYPOWk5sZz2OQ0405zjnH90HnDRdGG51Lo8c9V25bgedB1hGDKSGUcZr93M3YRuTW6T7g7u69zPe6A8vD0KPLo9ZTzDPSs9n3ppeSV61XuNe9t4r/E+74Px8fPZ4dPPVGOymXXMcV8733W+l/xIfqF+lX7P/I38hf5tAXCAb8DOgMeBuoH8wJYgEMQM2hn0JFg/OCP4lyXYJcFLqpY8D7EIWRvSGUoNXRF6JPRDmFtYcdijcINwUXhHBCUiNqIuYjLSI7IkciDKLGpd1I1o5WhedGsMLiYi5mDMxFLPpbuWDsfaxObH3lumv2zVsmvLlZenLj+7grKCteJkHCYuMu5I3BdWEKuWNRHPjK+OH2e7s3ezX3JcOaWcMa4Tt4Q7kuCUUJIwmuiUuDNxLMklqSzpFc+dV8l7k+yTXJM8mRKUcihlOjUytTENnxaXdpovw0/hX0pXT1+V3iswFuQLBjIcMnZljAv9hAczocxlma1ZskhT1CUyEH0nGsx2zq7K/rgyYuXJVdKr+Ku6Vhut3rp6JMcr56c16DXsNR1rNdduWju4jrFu33poffz6jg3aG/I2DG/03nh4E3FTyqabuea5JbnvN0dubstTy9uYN/Sd93f1+ZL5wvz+LY5bar5Hf8/7vnur1daKrd8KOAXXC80Lywq/FLGLrv9g8UP5D9PbErZ1F9sW792O3c7ffm+Hy47DJdIlOSVDOwN2NpfSSgtK3+9asetamXVZzW7ibtHugXL/8tYKnYrtFV8qkyrvVrlVNVarVm+tntzD2dO313VvQ41aTWHN5x95P97f572vuVavtmw/dn/2/ucHIg50/kT/qe6g8sHCg18P8Q8NHA45fKnOrq7uiOqR4nq4XlQ/djT2aM8xj2OtDSYN+xrlGwuPg+Oi4y9+jvv53gm/Ex0n6ScbTumeqm6iNhU0Q82rm8dbkloGWqNbe0/7nu5oc2xr+sX0l0NnNM9UnZU7W9xObM9rnz6Xc27ivOD8qwuJF4Y6VnQ8uhh18c6lJZe6L/tdvnrF68rFTkbnuatOV89cc7h2+jr9essN2xvNXTZdTTdtbjZ123Y337K71dpj39PWu7i3vc+l78Jtj9tX7jDv3LgbeLf3Xvi9+/2x/QP3OfdHH6Q+ePMw++HUo42PMY8Lnkg9KXuq+rT2V8NfGwdsB84Oegx2PQt99miIPfTyt8zfvgznPSc/LxvRGKkbtRw9M+Y11vNi6Yvhl4KXU6/yf5f+vfq1wetTf7j+0TUeNT78Rvhm+m3RO6V3h95bv++YCJ54+iHtw9RkwUelj4c/0T91fo78PDK18gvuS/lXw69t3/y+PZ5Om54WsISs2VYAhQw4IQGAt4cAIEcDQO0BgLh0rpeeNWiu/58l8J94rt+eNVsA9vcDELYGAP+bAFRUIq0sok+JBSCYgvgdAWxlJR7zfe9sjz7blgwBYA0jopvBv7G5/v0vef9zBjOq1uCf85/tUwOUquvSAgAAAFZlWElmTU0AKgAAAAgAAYdpAAQAAAABAAAAGgAAAAAAA5KGAAcAAAASAAAARKACAAQAAAABAAAAF6ADAAQAAAABAAAAFwAAAABBU0NJSQAAAFNjcmVlbnNob3RC+aX0AAAB1GlUWHRYTUw6Y29tLmFkb2JlLnhtcAAAAAAAPHg6eG1wbWV0YSB4bWxuczp4PSJhZG9iZTpuczptZXRhLyIgeDp4bXB0az0iWE1QIENvcmUgNi4wLjAiPgogICA8cmRmOlJERiB4bWxuczpyZGY9Imh0dHA6Ly93d3cudzMub3JnLzE5OTkvMDIvMjItcmRmLXN5bnRheC1ucyMiPgogICAgICA8cmRmOkRlc2NyaXB0aW9uIHJkZjphYm91dD0iIgogICAgICAgICAgICB4bWxuczpleGlmPSJodHRwOi8vbnMuYWRvYmUuY29tL2V4aWYvMS4wLyI+CiAgICAgICAgIDxleGlmOlBpeGVsWURpbWVuc2lvbj4yMzwvZXhpZjpQaXhlbFlEaW1lbnNpb24+CiAgICAgICAgIDxleGlmOlBpeGVsWERpbWVuc2lvbj4yMzwvZXhpZjpQaXhlbFhEaW1lbnNpb24+CiAgICAgICAgIDxleGlmOlVzZXJDb21tZW50PlNjcmVlbnNob3Q8L2V4aWY6VXNlckNvbW1lbnQ+CiAgICAgIDwvcmRmOkRlc2NyaXB0aW9uPgogICA8L3JkZjpSREY+CjwveDp4bXBtZXRhPgrsoP4HAAAA3UlEQVRIDdWUAQ6DIBAEoem/wJfBz+BnliXZ5khRENCklygI5xy7gnpPoW6K103cjH0O7r1fKwSeMxJ5d87xcbrVIHC5WuvcFUOcGmp/4NZaZYzJsGmbpPZEhIrvNWtRc7fEGLOKkVsTvm2bGrbnyBZYIi0KIcjUrr6SWRKGcVmAzzK/1T+FE4iiaRdlJVc+chMuC1BZa8Wc74LLAlCA1fco6IbLAlTQKvBOidXgr6A6KQZxDnCqa1Hs86Ok2oscOz0HNB8t9jI8TS9evmoWFT8urmZVW9iyCkrO/8I/QeOoVU66uqsAAAAASUVORK5CYII=[/img][/td][td]Selecteer de knop [i]geodriehoek [/i]en toon een geodriehoek op het canvas.[br][b][/b][b]Opmerking:[/b] met de geodriehoek verschijnt ook een [i]Omschrijvende rechthoek [/i]rond de geodriehoek.[br][/td][/tr][tr][td][img]https://wiki.geogebra.org/uploads/b/bb/Notes-bounding_box.png[/img][/td][td]Gebruik de handgrepen van de [i]Omschrijvende rechthoek[/i] om de afmetingen van de geodriehoek te wijzigen.[/td][/tr][tr][td][/td][td]Roteer en verplaats de deodriehoek op het canvas om de hoeken van de veelhoek te meten.[/td][/tr][tr][td][img]https://wiki.geogebra.org/uploads/thumb/a/a3/Notes-protractor.svg/24px-Notes-protractor.svg.png[/img]of [img]data:image/png;base64,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[/img][/td][td]Selecteer opnieuw de knop [i]geodriehoek [/i]om de knop te deactiveren.[/td][/tr][/table]

[table][tr][td][img]https://wiki.geogebra.org/uploads/thumb/2/22/Baseline-create-24px.svg/24px-Baseline-create-24px.svg.png[/img][/td][td]Selecteer de knop [i]Pen[/i] en schrijf iets op het canvas.[/td][/tr][tr][td][img]https://wiki.geogebra.org/uploads/thumb/4/46/Notes-ruler.svg/24px-Notes-ruler.svg.png[/img][/td][td]Selecteer de knop [i]meetlat [/i]en toon een meetlat op het canvas.[br][b][/b][b]Opmerking:[/b] met de meetlat verschijnt ook een [i]Omschrijvende rechthoek [/i]rond de meetlat.[/td][/tr][tr][td][img]https://wiki.geogebra.org/uploads/b/bb/Notes-bounding_box.png[/img][/td][td]Gebruik de handgrepen van de [i]Omschrijvende rechthoek[/i] om de afmetingen van de meetlat te wijzigen.[/td][/tr][tr][td][/td][td]Verplaats de meetlat op het canvas tot onder de tekst.[/td][/tr][tr][td][img]https://wiki.geogebra.org/uploads/thumb/2/22/Baseline-create-24px.svg/24px-Baseline-create-24px.svg.png[/img][/td][td]Selecteer de knop [i]Pen[/i], kies een kleur en lijndikte en onerlijn je tekst door de pen te verplaatsen langs de rand van de meetlat.[br][b]Opmerking:[/b] Je kunt ook de knop [i]Markeerstift [/i]samen gebruiken met de meetlat.[/td][/tr][tr][td][img]https://wiki.geogebra.org/uploads/thumb/4/46/Notes-ruler.svg/24px-Notes-ruler.svg.png[/img][/td][td]Selecteer opnieuw de knop [i]meetlat [/i]om de meetlat te verbergen. [/td][/tr][/table]