[img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAXkAAABICAYAAAATUoWBAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAEnQAABJ0Ad5mH3gAAA4zSURBVHhe7Z3NqxfVH8fH317Dh5VERBYkJkXcHhYpdBeZJpG4MKxFUFS3RQuJjGsuAgUVQRDxIRREkPIJWqRYiwR7gKIiqWijLVy00sz6A+5vXsf52Nxx5syZ7/fMvd+Z3i+YOzNn5vuZuefzOZ/zfGbOVEoihBCil/wv2wshhOghcvJCCNFj5OSFEKLHyMkLIUSPkZMXQogeIycvhBA9Rk5eCCF6jJy8EEL0GDl5IYToMXLyQgjRY+TkxR189dVXyZw5c5IXX3wxC2mXZ5991j3v999/z0JE19i1a5fT4ccff5yFDI/ZxaVLl7IQMQhau0aUsmXLluSee+5J3njjjSykPUjETz/9dPLnn39mIaKLLFiwILlw4ULy8MMPZyHDcf369eSBBx6QXQyJSvKilB9++CG56667kvvvv98l3nPnzmVX4oA8ZFNSW79+ffLMM89kV0RXIHO20ja6hFgOHn777TdnFxQ4eAbPEs2RkxelfPbZZ8nPP/+cfPvtt8nExERy7Nix7Mrw0Bz08ssvJ0ePHk2oSM6fP9+V5EV3oJSNztatW+d0uGHDhugZ9TfffJN8//33yerVq5Nr1645m1TTTXMaO/l8CazYZkt7HKU+rpH7itGmSpc44SVLliTbt29PFi5c6Er0g1Alf9++fcl7772XPPXUU1lIkjz55JPZkRglqnR4+vTp5PHHH5/WnDdIRu3zJ1988UWybds2ZyfYoRgQ2uRD+emnn6bSUtfUlStXpj766KOpVatWZVemps6ePTs1NjY2lea4U5OTk1M7d+7MrohRxKdLdIcODfR68ODB7CwMn3zM7ssvv3THdp8YPXw65NjSOGk+LRS4+5vgkw/YCbIB/yI7GYxGTj6tklU6b5SMIkQ38OmSxGZOnnvQrSW2UHzySbzYComb+3geCd4cvxgNQmwEu+Aec8g461B88rEFk4mdYINNCxriFsFOnsjOl8DymEJEN/DpEkhQbNxjDrgJdfJxDlwnkVtpbmJiIrsqRoE6HZJJc51aHjpkbzX5EOrk4/yxPe7BPqoyA1FP8BBK2s6ee+4518lShDGyH374YXL58uUsRIwyPl3GoG35on1kI/0huOP1l19+yY7uhA4SOk9EN/DpMgZtyxftIxvpD8FOHkeeVseys+moBN8tfLqMQdvyRfvIRvpDsJNnXGzVMKYrV64k4+Pj2ZkYdXy6jEHb8kX7yEb6Q7CTZ1JCGZqc0D2qdBmLtuWL9pGN9IdGk6Huu+++7Ohf/vnnn+xIdIkyXcakbfmifWQj/SDIyVtp/d5773X7PH///bfbDzorMgRWJ3zrrbdmbBbtoUOH3PP6uCqiT5cxaFt+FbKReMhG4jAqNhLk5H2ldeslX7Zsmds3haFUjz32mJvWzFaMEAyCNTE2btzoptnPBEzV5nk81wyyDtoY7X+IudxqbNquebUhHx0w5b0qfmUjcZGNxGEQGwHzh2QQMWjUXBMb1khhrOwHH3zgFiCaP3/+tCociYL1MFjIKr/OyUzA886cOeOeH5IT04l09uxZd7x06VK3L4NMDQXyv4t6zAaWLFnixlSvWrUqufvuu7OrshHRLxuB8+fPu71vRU9ksU4Yc5TqCHLyv/76a3YUFxYf2rBhQ7JmzRqXAIrrRm/dutUtgjTTijGIZEoHu3fvzkL8zJs3z2VUVcrB2N5++213bM1cM01bujRiyz9y5IjbW+mLBJC3B9lIfGQjcWlqIzbqyLdo3+TkZHLjxo3k5s2bWUg1QU7eBPERiSI//vhjdtQMqi8sHUoOVwVVrldeeSU7mx3Wrl2bHDhwwCW+OlgaFWOqAmN8/fXX3fFsTQbx6TIGMeUT58ykprpbhWwkPrKR+DSxEavBVRUEuP7XX3+5GgvffaijUXNNvgpk8LCm0PHxyCOPuOM333yztA2Nf4ScqixBkEFQVWGzKhC/57wopwi/taVN89Vh+/hBsR3siSeecHvWVS9Cx4rJ4venTp2qnC/Ae+7YsSN59dVXs5DZpUyXMRlWPk0WixYtcnMwTpw4Uaobn42QmKxtE1lguq9r6+S3Zg/56rB94q44u1s2MhiykVvwjvYe/I6luHHgVZBhvf/++9lZAFMB2CpzZYsJpS/jroUuTGSwWp3v8aw4V3Wdxax4HgsXcR/vFbrAla2cxwJcLJBl2IJJZavoEV5cIAk5PN/ixN63asEl4slkl8krghzuC9ma4NNlDGLKZ/VBnyyfjZieiXf0bMfs60Aui25hU+g4z9jYWKmt8R6ykTBkI/9iC70hD5BZdp9BuMnmXdnqCNI+kVEVkTykKhJ9IJPIqMIMwQeKCf1Hi/B8HL2BseTP8xQj3QwrnyFYgiszEBSZl837lhnBTODTZQxiyrcEUJXoQmyExEPcE+forQn2/PzvkFUmh/tkI2HIRv6Fe4t65j7kFkEmGYrJRlbeZqoIaq4Jafdpyueff+6qKMNAez7t+vv3789Cwlm+fLmr5hnffffd7bbQOmg3TSPXdaYYtLWyFkdxqjbVOjrS6NnPE9rTHps2dJknpvyvv/7axXMxTptA5xV6porbdPLNgw8+6PZ//PGH26MzqtMhcmQj1chGbkETEc995513spBbTTdgzTt50szRfVEtLzvvw6oYegglTrYpGDXTmleuXJmF3EnI5CrrwBkEG8JmkfrJJ58k7777rjuuAyMlseZhwaWyTIvEjiJWrFjh2tzYQuKM97L767a+QkHA16EWYiPDjMkmMaUlJ+ecAV2GFihkIzNDl22EjnV+m3fayCnLtNA1/Q6bN2++rVOOQ2jk5BcvXpwdDQdfYQffWGGbXEVHSBn80+bkKYU3xXquGaZGjvrCCy+48yJkSPDQQw+5vfHoo49mR7c6fUmUxUyLXB1FpNVS6ou3t7RamN1RDcO98r/xbYMQS5dVxJBPQaBqhAHU2Qi6Y5gu8X3x4sUstBl02GFnVqouK6HJRgZDNnLrtwbvSMd7WaZFLWPnzp3TdMp5CI2cfNnLAzlPEyzX8ykHAyaXswwhD5GBYhgXi3IohROWn65MLze93z74LdW9Tz/9dFq1Oo/1hherT4ySADIIy2wYA81oCuupp4d+YmLijvG5KHyQjCkmVbqMxbDyrYblm0ntsxHi+KWXXnKlqvHxcVfiIxHm9RxiI/yWUjljnDdt2pSFTkc2MhhdsBGrLfkYxkbI+HkP/NfJkyed0+d9ea6N2rF9saXBbKoqA7tNmiPUkjpD1xlQBuFcbwL3h/yGDonifWmGMu0zY9bxwX35zhc6Jeqegfw0Qr2dLdzDlsc+WcdmHSm8E+fW0UanMO9FeF6+hbNZj/pMQpzw7LaIJZ94DZFTZiOmV/QExD/n2I6FQYiNoM+8XsuQjTSjSzZineU+BrUR/BW6Rz7XOLdOafaA/jlHfr6j2sLZsBcfQTHNP46wMgivSyhF+I39Ez74p4v/XChEXl0C4R189/Bcnu/LBLqGT5cxiCUfm0KHdbRtIxQifIlINtKcLtkIPqLOiY66jQTFNAopc+REHtfqIiEPuSS/KRsiVAb3YxRNFESOaqWnKpBbzFnz8Dyem8/V+0CVLmMRSz6JIqQgAG3ZCPaNbbMvQzYyGF2xEZyyT//QBRsZysnzD3CtLrHkIUJCct88RDYOOVShVRDRyGHP/1OlGEp33Nen0pnRhQRM/Dct+cSyEcA+sQ3+j6rEKRsZHNnIzBLs5MtK602dvCl3tnI1Sm+8AxFf5eD7TpUuYzGsfOyDkk9oTS82JMjZttPZRjbip2s2Uuvk7R8qc+Tm5GcrskUzfLqMQdvyRfvIRvpH7RBKm8lVtmKcLRnKsDAx+vh0GYO25Yv2kY30j+Bx8mUrxtk4zeIYXzHajPrqgmL2kY30h1onb6X1MkeOkx8rTN0Wo4tPlzFoW75oH9lI/6h18levXq105MzyGnaRMTFz+HQZg7bli/aRjfSPWifPVN/XXnstO5sO06754onoBj5dxqBt+aJ9ZCM9JOuALcV6wtkXYUQNw5hEN6jSJaMcGG/MNYaEMbZ3EKrkIw874Vqbw/LE8FTpkFF0aenbXcNWBqVKPsMQsT2uYSs8S8SjtCTPgjwsmsOymakTuL2QEIvm2Get9u7d6zYx2lTpElj4iEW0WMnv2rVrbrEk38eDy6iTf/jwYVd6Sx1FFipGDZ8OSfPPP/98smfPHgqEWWgzfPIJ57sQ69atc/LTgkDjBQ9FDc7VF7CSXXFmGDku4VxPlZWFilGFElOVLoFrlNKAyWFNS2lN5IvRpE6H1L6GSet18qnpUYo3uGfQ2qQoZw5/UgWI/xiU0PhIhamf5W8vXLhQ+yH0UIryRTehFE4trK3RMCz1PD4+7pbRpVTPUrxnzpzxLkMumhE8Tl70ExIWDplmFT5ygZO3jx8Mw9y5c90e+Wys0c1edIu0FO4+rAM0v9k6+DFhKDa2QXNOWvJ3Y+gpdIhIUJL3QXWb22yj6qWmmn5gnWnok450jsuq1IPCGkHIpDNNzTbdxNZ7It230Yxidoct0hzMHnv5r64b1AZBzTX5KpVVw1MlqEolhBAjTlBzzeXLl29/m1Az1YQQojvUluRpn2VIE0PsYOvWrS7s/Pnz7lwIIcToUluSt48JL1q0yG10xBw/ftyFCSGEGG1qnfzFixfd1+Qp8E9OTrr1ahYuXJhdFUIIMcp4nTzDmpituHLlSne+evVqNyvy0qVL7lwIIcRo422TZ1zs5s2b3bHdtmDBguTGjRua5CKEEB1AM16FEKLHaMarEEL0GDl5IYToMXLyQgjRY+TkhRCix8jJCyFEj5GTF0KIHiMnL4QQPUZOXggheoycvBBC9Bg5eSGE6C1J8n8W6znsLP0nAwAAAABJRU5ErkJggg==[/img][br][size=150]When you change the [b]function (pink)[/b], both upper and lower integral expressions update simultaneously to reflect the new integrand. However, the [b]integration limits must be adjusted manually[/b], they define the [b]region of integration[/b] and are [b]not auto-updated[/b]. These limits are visualized as boundary curves on the right-hand graph, and the shaded area shows the region enclosed by those limits.[/size]

[u][color=#0000ff]https://www.geogebra.org/classic/ygf7wecq[/color][/u]