Welke eigenschappen gelden voor de zijden van een parallellogram?

Welke eigenschappen gelden voor de hoeken van een parallellogram?

Welke eigenschappen gelden voor de diagonalen van een parallellogram?

Toni beweert dat een rechthoek geen parallellogram is. Heeft Toni gelijk?[br]Motiveer je antwoord.

Toni en Loni tekenen beide een parallellogram.[br]tekening van Toni:[br][img]data:image/png;base64,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[/img][br][br][br]tekening van Loni:[br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAJkAAAC4CAYAAADwrE4pAAAAAXNSR0IArs4c6QAAAIRlWElmTU0AKgAAAAgABQESAAMAAAABAAEAAAEaAAUAAAABAAAASgEbAAUAAAABAAAAUgEoAAMAAAABAAIAAIdpAAQAAAABAAAAWgAAAAAAAABIAAAAAQAAAEgAAAABAAOgAQADAAAAAQABAACgAgAEAAAAAQAAAJmgAwAEAAAAAQAAALgAAAAAXAKHkwAAAAlwSFlzAAALEwAACxMBAJqcGAAAGbhJREFUeAHtnAnUHFWZhgWRhH0PaxICgbAjCHEEQpDjOGFfZEcWEREDYgBlRiREBBEUGER0PCgkEpFFQMBgBJGQyCr7qoCQQCL7LpuQZOZ5oGusVKq7q7ur+6/uuu85T6rqbnXv17fu8lX9+chHgoIF8rPAchQ1Dl6AK2BLCAoWyM0CK1LSW/AAHAI/gv+FrSAoWKBlCyxJCa/B2YmS/sL1wYmwcBks0JQFfkWuO1Jyvk7YqJTwEBQs0JAFtiD1bHA9ltSGBCySDAzXwQKNWuASMkyulWnBWpEhLlgggwU2Io0dLU39CVx7obSYEBYs0IAFXPQ/nZL+o4TdA4+nxIWgYIGGLHA1qadCtCZblPNd4Rm4E8KaDCMEtWaBxcg+HfSJPV85ej4GPtAC0Uk4Bgu0YAGnxo1hEDwL+sfegKBggWCBYIFggWCBklpAj8ShcBmE5VZJO0E7mq0/dSCcDi7q9fC72M/kZ82UiMKCymuB/Wn6E6AvbJMKf+I4DeZCULBAUxawM/mpzjswC06CwaDcSRo+wougYIFGLKDT1C8m/gpOiTpS0z46HE74mxAULJDZAkNJ6btHPzh8FY6AlaCariXitGqRIbxvLTCM2/vdlc7KGfA72A1899dpLcMN94E7wFHrOtgR6mkpEph+03oJQ3znLbAWt/THuRI2Az9JjnZq3+S8E9LdsAKcB3PAket46AdZtRMJ3wVfJQUVyAL6lVznnJtSp5cJ2z4lPO+g0RTot/d2dP1bW4Of4TSqiWRwag0qmAXWpD7+uMkRw68WDB8FectRa304Axy1dD+4jnKabEX/JPN6rRQQ8rbHAj+gWEeApH5CgJ3smGREi9f7kn8mWPYfYAP4KLQqH4YXWi0k5G+PBe6l2AMSRa/MtZ3gZngIWn09szllTIB/wAyw4w6GPHUjhV2QZ4GhrPws8ChF7Zko7lauJ4FTqdOZC/JG5dS3CzwMvubRAz8SmtHCZHIjsmqVzIsT/ha0Y2qvcssQ3IgFXBdNjWXwXC96/0rYExwPrJxnOQwhkX+drdf9Ffgy2OFaGQ0dpfwGbFFI0yYE+jAEFdQCS1CvJ+ENmAu3wPIQaUdOToguqhz1Tx0Gd4LT7OXQzKiyN/kuhNNgaVDjwA4bXRuW1C8I+HEyMFwXzwK+jtG7nlW6PgaCP64dy1HrRFgQGtXHyHAT6OOyk+lScXOwO1j22lBNbhpMs2G1BCG8Oy1wJNV29HPkew+OBjtds7qVjI6Ci8cKiEbFz8XC0k53IvBNiOdNSxfCusACn6CO0ahlB3PUcqodDXdBs3KK1L8VX7f5KuspcIT6NNTSRCJ9BRbUpRZwsb4nPAf+4FMg6ewcUokbzLEZPUwmO2pck7m4G+zIL8QjUs5fI8zXYEFdZgFHrSvAEcadpjvEau4D12Cm+QY0Ktdidl6Pkb7OiZsQP+1RbkSu/eBs/n82J0jfW1CXWMAd5T7wCPjD643fBrLoUBL9LUvCRBp3jN4rkp3b63+PAjiuAbon9oyFDeD8QLgazo+Fh9OCWmAQ9foN+OM6guiKWBicKhuRboZtGslAWjcL3tfR0Hp4fhwktSUBxl0OulOcIqeBI+32EFRAC7gTOwoeAn+8i2BraEW+A9X1YIdpRI+T2KnZepxVI+Nw4hy1roHDYWMwz6IQVBALuO7xNdFPwR/HBfVYcDTJQytRiOVu1GBhjlJTYMcG851D+ksazBOSt9ECX6XsZ8BO4A+zDjgl5q1vUaDvQjuh97mJo1lp5Bb6UpgEjg4uTPtajhAXwFvwFLjWaXe93BG+Da7r2qnPUri7ynY8KO2sd1Nl+yTZqRwhJsAp4C7L6xHQafkj69ycBXPhOrCTjYRO6RBu9Cb4uqddupiC/9CuwotWrltoO1R8e+2uzCfZ8CWgE9qUm/wW3G09DQeCo1Z/sB66Bjop7eJroXbJ9eTO7Sq8aOWeToVerlKpqwh3J9QurUjBXwB3iLPBH3YbiGsIF3Yyj53UCtzM6ezrbbjpUMqc04ZyC1vk5tRsepXa7US4U1WeW2xHycHwa7Dz6C86HKpNTa7L/EGWhE5rdW5oHffL+cYTKG98zmUWujgXnhrStVBS2xLwLuQxZVq+C3f9UN7vfPgkVOtcRH2gA/j3xcp5XxxcRlhfH7g8pB386uM/8iisW8rwR34DhqdU+JeE3ZwSnjVoIRJuAueBP5QbiuOhH2TV2SS8MmviNqWzo1v/fXMo35HZDc2yOZTVNUUsSE1dE30jUWMX3hq2mVHMKXE0uLi1jEthdag3apFkPt1ByMHzhXY+YAS3tC0TWry1bxVuaLGMrsz+c2odbaejaU2D7tZga0aS3g71PjwMrrX0orci6+EGoQhaj0o8Bn+BrZqs0KvkczQrnewM/pguwj0+C1kNsRxp94eZoPthMjhF5iHL0V9VNEXT/xVUbA1wNsgilyTvZEnYi2l8J7g2+KOuBo5m9fRxEjjsO2rNgr0h7x2gU8s0KKJWoVK/Ah9KR7dDoN5yQAfs7yGohgVWJG4MPAJz4ELYGtohfzB/vLHtKDzHMtegrFMg2jXfz7kj3VdgO9gc1oFh8DLsB0EpFtBYkV/rOc6PTEmTd9BSFGhHXj/vgttYnnU+CNwNPwNvw3tgOxzxxB13UMIC/bn2CXRq8Il0au2ERnET14bdKnfYOrF1VSwNP4FLISjFAmsR5hNYTxpUY+alP1PQ0XkVVoBy3qUO2xagHoWswjnUamKdmq1LvLtAd5cr1EmbJXpNEtmxB2VJ3AVpRlBHp83lu6CuHa+iQ74dRyNV0wAiXHMcB745yGMj8B3KeRy8fy/oDBrhyByUYgE7ly4KfWHVdBsRbs2VXy2M/OCstX9eIvvOrRVRqNwzqc0uhapRgSpzJnW5s0Z99I29Ba7FnCad4vS3taJDyfx0KwUULK9r2rkFq1OhqvMUtdm9Ro1uJ86OqHYAp9bFvGhSi5DvFTiiyfxFzHYBlZpUxIoVoU4uumvtKvtV4hevVPZsjlMq580e9iGjI+OCzRZQsHy6f3xXeVDB6lWY6vyYmtR6BbIX8Q/Hansf57vGrhs9dQS0U49sNGOB0w+ptMnlRFDCAgtz/SIclgiPX07gYnws4HXO3V3aUaaCT3Ej+iWJ74FeGcVs+7fA97tBKRaIpsqVU+KioHs50YiRjudkD/Cdo9v1aMfJaV1tRgo7Z6371S2kgAlcX36mgPUqRJVceN9ZpybTiR9dJc3nCXfTkEU6KF2HfSVL4i5KM5y66oANU2WVH+1JwmvtKs0W72QLcO1GIJJfIpwcXdQ5OrXeVCdNN0a763adqm2CEhaI3lUukwhPXj5KwJhK4MEc7Zg7wEPwGNSTxndK1SfWS+uwqN3a4JDoIhzntcCJXP4NXFvVkov0aE3mRuFcsIP5CqVeByXJR74Hb8NqXvSY/O7ONWYYxar8sHcRPrZKXDx4IhcXxAMaOHeT4Ouq9RrI001JfdB+100V7mRd/VbMJzDLYnUJ0g1sonITyOObgcFN5O2GLNpQV84B3VDZvqjj4dzUabAdWoxCJ8NzMKwdNyhImetQDx/UVQtSn8JVw8X719tQq6GU+Tw8Aj7pvaxjaJw+xKAUCzj1+QRumBLXStBZlXLHcVyolYK6JK+75Z27pK4dr+Ye3PHlHO+6E2U9A0/AiBzLLXJR0VTZv8iV7Mu6XcfNI5dEs/VwpNoIfHGut/u/oExy1L4Hqvn9NiUu8i2WyS4ftNXvuJwql2+h5YeTd3qlnLEcB7RQVjdm1SemA/boKpW34/kGwK9bSim/tnAtUe0JTDPKUgSOhP+BuTATToJFoYzS7eODGn1fl7SB4drJNyqlk0/gzfCzDC23Y+0H00CDylXQq05VmpZZx5FySo3UGxPn30CUUr4+0jk6pNJ6r33Vsy0cBRPALzJeATuVQ/442AKWhKAPLfASh31rGONI4qKPQMdw/iDMAB/unt91b0Uj7Ty+r/STG8/FTmWYGwI71dZgBwya3wIbEKTNBs8f9f8hv+LMjZCdStseD3vBLLgIelrX07rzwJFJT7wvt90I+NI7dCqMkEHHkkZXTS05cumMfg76xRJ6bgd19uhJ2aFs4GY92brONeohbnVwndu5HtPWaenuIPwI6EltT6tcj/leMag5C6xENjtPrVFf+5pGW6fJjZQbh57U+bTq0p5sWecadRq3ciSqpVWItJONT0mky8e4gSlxPRH0Dq3I+11lTxgmYyPcFU6HeqPQuqSxI42CuBzhHoOJ8cBeOtdF8WovNagP2rIs97TzOFLVUjSl7kCi5WAwuLP0u7MHYEHoSU2iVZf1ZMs616gvcau7M97ODvYu2CnfA3eaB0GttRzR3av+VP012L17m1CIms+gFvsVoiYFrMRQ6uQT1bNPUQdsvk7Fhqt24F51b1HE+fYr1PpimFO39iFBNQvsTMTT8Gy1BGUPd20wouxGaLH9fyZ/vV1li7fo3ux2Lhee7oyCmrNA5NtapLns+ecq2nS5K0102+xL2qDmLHAU2e4E/Yw9Ld/8NzPl+RdJe/e0ZdrbOAeNmVCKqfL7NFQfjR8dZpVv+t1VBjVvgQFk1YZrN19E/jnb9UGaX1DosW+k03yD9H4fFtSYBfQrbgR+rbIdOBs8Bj2vqbTwrAZa+THSug47tIE8ZU3qlOjifnv4Pfggvw8zwE3TF6EUcvGuvyurBpNQYxXCeZi10n2Qbl/ueRf4Rx+z4NvwCVgBtJ02XB5Koado5Y6VljqU+4cKtTSayPtrJShx3Iq03YX8G/A8+GdraV+n/Cfh06FdSyCKLpac+j4Jj4JPl9T6Vtzv9feEoHkt8D0utZ0P7bbzRs13dTshp84X2sMBL9O2v8CN4I5nKPjl5ZGQ1JoEaMilkxElvnap4cbJ0X1kBjs4emlDbV0a+RWF3437Bx+RDuPk6egidhzLubuh8EL8w2+/bsYW78CXIatc7LsOLpXepLX3gDuhuHzalo0HcO5C9tuJsDJejqLRs+FKiD+cWWwxnUTHZknYS2l8yT0+pUFzCBsUC9eYdrzS7IhibY+fnlSxw6HxwIzn2lMbrp8xfc8k84mMuzAW4FpDJj89cZgv+67yDGygvdwoNSPdGi81k7Gb80Sj0zU0wvXWKfAQ+LQNh7ie5OKYeEDJzh3t3RDFR/dGTTCVDKWbKl2HjYFL4Ea4AXyXuTLENZALO94G8cASnWuTt2BwC21ekrzacKkWyujprPrF3IWWUbvRaDvHRi023lnAnXlyg9Visb2T3fdu43qnOZlbYseyg22bOUd6Qte57szPSo8OodG6rYy7yif4+cfn0AX8+mIurJ1DWT1ZhFv16VC2Yd6R++81flHt4SJen1k97UoCN05BKRZwmL8FzkuJ6+WgITTOaXJElUauRvgMeAp8Ea6daknXT5l35rVs88H/f+Vrk2b9QjULL3DkL6jbzVXqtyjhz8FV4Ld1dsZancwOaZphEJRigS0I8+VvmTSYxtoplklp9EKEPQL6FZUvuet1sgNI47th8walWGAyYaemhPdykB1oUpUG7kK4/rLFKvF7cZwJtUYybaifLSjFApHzcNOUuF4NWpyG6dXfqkoDXyH8c7E4O+PlsevkqZ3PkW6FZES4/tAC/u8xfo8ePbVlsIvvFnVbpGkkgX5MEHnsde34Ld5OUE1fIkIHbFAVC1xA+JVV4no1WDfDQVUa55R3byxuRc4dparJUcz0wQFbzUKEvw2b1Ijvtai1aJCdZlCVht1E+LhYnDvu2XApfBeWhrgc8d6DzeOB4fxfFtia01f/dVmKM79ufQmqffX7InF2rEi6Lxz1ToDrwXe78byf4drygqpYQB+QT2iZ5NLgJzUa7Ci3ZI34p4lztxnpRk6+GV2E47wW0NnoKBbfRc2bojevHHXiI1W8lfq47GTxkSoeb+czfv1K4LKV6yGV63BIWMCXuBrM3VNZ5PrJNteS8b7ojmTHmwFTwF3n6RDpIE6cPuPpo7hwxAIa69cls4RuiGqui8gUuivWjS4qx/U4ToSDK9fR4VpOfh5dhOP8FvCprOaMnD91b4ScTTN+W6cpjna1PPvx7I56a8QDuuW8E5/abIkxvI/f+ZdJuhnqOU1fJ42dp552I8FM0OfWdepEJ3OxbwdzPVEWuZjXR1avk2W1x/EkvCxr4jKmc12yf8ka7m76Ddghh3ZvRxmOdlvkUFZPFlHvNUlPNppGLQ2+FN+syQYOJN9x8Az4lkTvf1AVC5xJuH8wUjYNoMFzoRGfllOsrp7J4Mj1d9gbgmpYwFckr8AXa6Tp1ahVaJgdZfkMDdROvkaaBeb5IejWyLrrJGl5tSZN12grl9AETne2fbEqbbcD+aGAfi/TuUE4FuxwQQ1Y4HDS+ippFAxuIF8vJLW9dp5+KY05gLBnK/FXc+xK31dKu/ok6GHuehM8CC6CNfp0mAROoctAr2p1GmZ7IxeRo9aF8BZogyPAKbURuZkYDbqEgrDAYNDILmYjuT7ZEy6Cv4PxvwVfIPfaNLFapX2+WroH5sCfYBtoRroxZsNToN0OgtJrLBZwnRHvZHGj2KlWgh+AP4BbdTtbL2g5GuGoZWd4E74Gjbw+Ivk8GsSVO1U/+XFkPA98OEsvn97vZLSC0+aJ4I9yCSwO3SYfpv1gCtgOO4GjWKs7RJ2600C3RqSbOPlZdFHWo6OUhnakakR+P2XnfAdWh6LLDqQ/7HhwKtPD/yOwHXlpYwrSlltXCtSP5rVrvFLrQFr/YJMW8Ic7CZxChzdZRieyuWO+D/zBb4URUM1dQVTTGkZO7+GifxXwL72OgtLrMSxwdItWOIX874EL6KJodSrip8/PgaPWubAetFOfonBH9kXgr3ANlF6DsIBP3oY5WOIcyngdXJf0lVxr2ZGuB9s1A/aATumz3Oht8NWc9xen5uPAUb+U2odW2zHyMIA7qengDrTT6s8Nx0H0que/OXfq6rQ+zQ31MbqJ2gVcoxnmaFraUe1aGu9Ul5ecLn1618qrwBrl2Kk/AePBez4KY6CaG4aotmsz7mAnWzhxJ+3iuvXfEuE9f+mP5I+zfM4tvZry/gh5jI7VqnYIES+C9b8cBkIR5G7SxX7apuI6wp02S6Uv0NoZTbR4iTp5HMX88dMMXSdrzejNib0I3GA8AYfDSlAkrUllbHtyAzSUMNdqO0Jp5ChzCzTqJPwqeWZmsNJtpHHqalW6AvxhdLHMhWmwFRRVbnpcF7rOPRtcG0abgMs4L5VcKLvV3qKBVutg9CnNkmdf0rnYbVYDyHghvAu+pB4NOk3bOQVTfC76GKX49uCHFXwwh0A31J1q5qdPUZS+o6ScCseC6yqPkVbkxB/8sCigztHpwQ6piySr/HH2h6lgXndjpZpeaG9P6Spac1qiRctw7ajxJPgUvgITwN3afTAJskpnpGunUXUyuPmwA9uhTf8aOM047QR1sQUcrRwpNkm0wU7nWiqSnc7R7lZ4AewQjegBEtfaTTlK3Q/WxbXWlpBls6B74NxKHt89hg6JEYom1wuux+xscc3gYmQ8gHMdinYCR5c06adyvZEmNxXnJyLW4Ppb8Dw4Up4D60BWbUtC6+PD4KLaEfYuCCqYBcZTn6tT6uSPvn4i/G9c/wZerRyX49gPPg6/A3/wMZCmIwi8oRKxIccbwfRPgJ23UUUbj0MSGS3z2ERYuOxjC7zJ/TdLqYOjiyNTpJs4uadysQrHqFP5o/4DnLJ0PlbTDkS8Da7xzHMGDINmZUc/ISWzLoOfpoSHoD6ygLtKO1ma7iVw10rERI4vgiNXXAtysVg8IHHuJkGn6S/AjuWa66vQqr5EAY6qSVkf75PcxCTThesOWuAq7nVplfudQvgt8Ag4qi0FjciO8Dr4o3uPlSEvPURBadOyLg/v9928bhTKac0C7sLcLe5RpZiVCP8jnAiLVEmTDP4kAZfAHHgcDoUBkKccHf8Jn00UqnPzDrCTfT8RFy77yAKuh/xBsnagatVcmoid4a9geVPAztYu2cneh1GJG7hONHwaXJGIC5d9ZIHvcd8rW7i3I93FMBtc+Ds9Lg6OKO3WeG6g3y0uNyUTYHdwU9CJenCboFoWsGNsVStBSlw/wj4POmQdtVzTbQed1kLc0KncOkyFZ8CR1E3IumD4IAjqQwtswb1d12RZzLtj81XPyeB09Br8AIrgWd+AehwD+0BcrglHxAPCeectcDa3vDvDbXclja4MR4YbYUuo5bIguhDamFo4dQf1oQX0MR1c5f5DCT8BXoAX4YdQy8lKdFCwwLwWWIFLR6a43LF9HNyZGfc47ABBwQJNWeB0ck2u5FyC46kwC2aDO85hEBQs0LQFHLFehjPhQnDUehhGQ1CwQC4WcJRyxLJzTQR9XcGfhBGC8rPAkhTldj/vVz351TCUFCwQLBAsECwQLBAsECwQLBAsECwQLBAsUBwL+LnLWcWpTqhJL1rgdhrl1xL9e7FxoU19bwEdrjpb/b6+CJ/j9L1FQg1yt8B1lPgs+FFiN3yWk7sBQoHttYBfWPjaaAy8C74ADwoWaMkCfrUa115c+MezfmVh3MIQFCyQqwUcvbaBVcF12WoQFCyQmwWOoKSXoB/4SY+dzK9cg4IFWrKAnSnSFZw8CP794d6wKdjJnD79KDEoWKApCyxUyXUcR6dGRzH/O4Dp4Pf5a0Krf7xLEUFlt4AjlzvKHSG+EfgZ1ydDULBAyxa4iBJuSynla4RdnRIegoIFGrbAWHK4m0xqOAEu/uOjWzJNuA4WaMkC/nHrGxDfHLRUYMhcTgv8H8nqmdF6NVNIAAAAAElFTkSuQmCC[/img][br][br]Welke verschillen merk je?[br]Beschrijven beide tekeningen correct een parallellogram?[br]Motiveer je antwoord.

Is deze vierhoek een parallellogram?[br]Motiveer je antwoord.[br][img]data:image/png;base64,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[/img]