Rotation3D

I have only been using Aspose slides for a couple days and I was wondering if anyone knew how change the Y Rotation for a chart with a type of Column3DStacked. Also is there a way to change the color for each series.

Hi Mike,

Thanks for your interest in Aspose.Slides.

I have tried to understand the issue shared by you and feel sorry to share that I have not been able to completely understand the requirement shared. Can you please elaborate in detail along with the presentation having source and desired charts.

Thanks and Regards,

Mudassir,
I am just using the example code for creating a chart from scratch. The only changed I made was the type of chart and added the following line

chart.Rotation3D.RotationY = 0;


Here is the complete code

//Instantiate PresentationEx class that represents PPTX file

PresentationEx pres = new PresentationEx();
        <span style="color:green;">//Access first slide</span>
        <span style="color:#2b91af;">SlideEx</span> sld = pres.Slides[0];


        <span style="color:green;">// Add chart with default data</span>
        <span style="color:#2b91af;">ChartEx</span> chart = sld.Shapes.AddChart(<span style="color:#2b91af;">ChartTypeEx</span>.StackedColumn3D, 0, 0, 300, 300);


        <span style="color:green;">//Setting the index of chart data sheet</span>
        <span style="color:blue;">int</span> defaultWorksheetIndex = 0;

        <span style="color:green;">//Getting the chart data worksheet</span>
        <span style="color:#2b91af;">ChartDataCellFactory</span> fact = chart.ChartData.ChartDataCellFactory;

        <span style="color:green;">//Delete default generated series and categories</span>
        chart.ChartData.Series.Clear();
        chart.ChartData.Categories.Clear();
        <span style="color:blue;">int</span> s = chart.ChartData.Series.Count;
        s = chart.ChartData.Categories.Count;

        <span style="color:green;">//Adding new series</span>
        chart.ChartData.Series.Add(fact.GetCell(defaultWorksheetIndex, 0, 1, <span style="color:#a31515;">"Series 1"</span>), chart.Type);
        chart.ChartData.Series.Add(fact.GetCell(defaultWorksheetIndex, 0, 2, <span style="color:#a31515;">"Series 2"</span>), chart.Type);

        <span style="color:green;">//Adding new categories</span>
        chart.ChartData.Categories.Add(fact.GetCell(defaultWorksheetIndex, 1, 0, <span style="color:#a31515;">"Caetegoty 1"</span>));
        chart.ChartData.Categories.Add(fact.GetCell(defaultWorksheetIndex, 2, 0, <span style="color:#a31515;">"Caetegoty 2"</span>));
        chart.ChartData.Categories.Add(fact.GetCell(defaultWorksheetIndex, 3, 0, <span style="color:#a31515;">"Caetegoty 3"</span>));

        chart.Rotation3D.RotationY = 0;

        <span style="color:green;">//Take first chart series</span>
        <span style="color:#2b91af;">ChartSeriesEx</span> series = chart.ChartData.Series[0];

        <span style="color:green;">//Now populating series data</span>
        series.Values.Add(fact.GetCell(defaultWorksheetIndex, 1, 1, 20));
        series.Values.Add(fact.GetCell(defaultWorksheetIndex, 2, 1, 50));
        series.Values.Add(fact.GetCell(defaultWorksheetIndex, 3, 1, 30));

        <span style="color:green;">//Take second chart series</span>
        series = chart.ChartData.Series[1];

        <span style="color:green;">//Now populating series data</span>
        series.Values.Add(fact.GetCell(defaultWorksheetIndex, 1, 2, 30));
        series.Values.Add(fact.GetCell(defaultWorksheetIndex, 2, 2, 10));
        series.Values.Add(fact.GetCell(defaultWorksheetIndex, 3, 2, 60));

        <span style="color:green;">// Save presentation with chart</span>
        pres.Write(<span style="color:#a31515;">@"c:\AsposeChart.pptx"</span>);</pre>This gives me the following chart<br><br><img src="data:image/png;base64,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" alt=""><br><br>I would like the chart to look like this <br><br><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAZAAAAGQCAIAAAAP3aGbAAAgAElEQVR4nO2dTaxrWXaQPfTQwzv00EMrYmC9CSYojflpyS2IZGjUslDnYaEMnCgE90+1o4SqK2io++iiynSqW+4otNwRUqwK4V2UBh3UEyNBZAISjlSC02+CZxxmZ3gYrHt3HZ8/n+O9fc7e198nD+r5+vnte+vuz3uvvfZarQgAwBFaTQ8AAKAsCAsAnAFhAYAzICwAcAaEBQDOgLAAwBkQFgA4A8ICAGdAWADgDAgLAJwBYQGAMyAsAHAGhAUAzoCwAMAZEBYAOAPCAgBnQFgA4AwICwCcAWEBgDMgLABwBoQFAM6AsADAGRAWADhDNWF9/uZVK8brtxe/CACgMuWFlfDQE6/efF75RQAAF1FWWM8miq2X3r5O2ij9oudnUBYA6FNSWCKepHZEWerZxB/jfxNjAYA+JYUlLkqFo06ezpbas7EIZQGALpWElSOjp6dzpJb3dwEAKlJpS5jUzkkUK3cllbPyuoh37979DKAuDPzKglFKnxI+ySmL6wjrxz/+8QdZ/D64yU8++/4nf/jayONb/+yXf/VbfyPz8emP3hgcc7VfWbg+VfKwkjkLr9/GXXT9FdbPf/7z999/X/ddoCH+z//9nz/4D1818vit3/1rX18MMh+f/fTTpr9RuCJ6me4nYaurx7AQltMgLNBHS1inirr6KSHCchqEBfpoCCtloqI8LBNZDQjLaRAW6FM+0/3NiXKeY/Anenp+MukwQ1lYCMtpEBboU1ZY2YeEOZmkZ192GQjLaRAW6FN+S5hwUW4Q/XrFGhCW0yAs0MelelgIy2kQFuiDsKAmEBbog7CgJhAW6IOwoCYQFuiDsKAmEBbog7CgJhAW6IOwoCYQFuiDsKAmEBbog7CgJhAW6IOwoCYQFuiDsKAmEBboo9X5OftC4dUuEyIsp0FYoI9u5+eEkK7a+RlhOQ3CAn2qNqGIuyf11JU7PyMsp0FYoE+1VvWZ1URr6/yMsJwGYYE+FVdYpwEpkRE13aEMCAv0qRzD+kJIyQUVXXOgCIQF+lQ6JUwVQI7bqa5Gqk03A4YL+YPPvl+DsD764XsGx1ztVxauT9U8rJNjwKwDwqs3UjXY1xfq5Cf1COsH3zY4Zt1fWTBNBWGdnAEqcSkR0fkZCmFLCPpUOyVM6Ohpi0jnZygBwgJ9SgqrWEbyPKeEUATCAn0qCSu9Sjp5ns7PUADCAn1KCiszYz31JJ2fIR+EBfpUvZqTQVxGdH6GPBAW6KOXh5UVSafzM2SCsEAf6mFBTSAs0AdhQU0gLNAHYUFNICzQB2FBTSAs0AdhQU0gLNAHYUFNICzQB2FBTSAs0AdhQU0gLNAHYUFNICzQB2FBTSAs0AdhQU0gLNCnYrWG89ef6fwM2SAs0MewsOj8DHkgLNBHb0uYKNlH52fIB2GBPjrCShYTpfMzFICwQB8NYSX9RE13KAJhgT6XCyvVl4KuOVAEwgJ9LhVWet1UV+dng20yoU7q6fz8G9/5mqkB0/nZQi4UVsaqqa5GqgYbkUOd7P7bYw3C+ugH3zY14Hfv3un+yoJpLhJWppvo/AyFsCUEfS4RVo6aiGFBEQgL9LlAWHkC4pQQikBYoE9lYRX4h87PUADCAn2qCuupNWG2f+j8DPkgLNCnorDOxaPo/Ax5ICzQp5KwSm3v6PwMmSAs0Id6WFATCAv0QVhQEwgL9EFYUBMIC/RBWFATCAv0QVhQEwgL9EFYUBMIC/RBWFATCAv0QVhQEwgL9EFYUBMIC/RBWFATCAv0QVhQEwgL9KkurMRdwby6WFe4TIiwnAZhgT7VhJVZjCFuJDo/Qx4IC/SpICwlo5M10+dv336efAWdnyENwgJ9ygvrfGl2Oj9DAQgL9CktrLwWE19ATXcoAmGBPmWFdd5XdM2BQhAW6FNZWKdx95iG6ur8/P7N892PvmXq8d5v/3rew/iw/+lH36xBWL/xna8ZHHO1X1m4PiWFlX36dxKDr6uR6rub59/96T82Mu0//Dd/M2/af/d3/4HxYdfT+fmzn35qcMy6v7JgmorCOtXO02pLnqTzc13UIyzjw2ZLCPpoxrDiTxPDqgmEhbBuFiPCii+xOCW8OggLYd0sZYWVrZ3TZ+n8XA8IC2HdLKXzsDKiWKm2znR+rgWEhbBulkuu5pyQGYbPPkfUBWEJCAth3SwXtarPltUTdH6+NggLYd0s1MNyD4SFsG4WhOUeCAth3SwIyz0QFsK6WRCWeyAshHWzICz3QFgI62ZBWO6BsBDWzYKw3ANhIaybBWG5B8JCWDcLwnIPhIWwbhaE5R4IC2HdLAjLPRAWwrpZqrb5KnGxmc7PVwZhIaybxbCw6PxcAwgLYd0sVYVVuF6i83MtICyEdbOYFBadn+sBYSGsm8WgsKjpXhMIC2HdLFoxrFMJ0TWnJhAWwrpZzAXdHez8/C9+NDfy+J2Hv/8Pl1/LfLz3279mcMDC+l/+ve0Hf0v/8Xu/+dfnv/wXMh+LyV8xPmw6P4M+l+dhPQvs2USudX422Ij41//JX8qbP3/i/aGpASv+7L1v/OwrX9Z/fPZXv/TtX+hnPn74K183Pmw6P4M+WomjJ5s91zo/G9yhFAjrz//Xn5oasKIeYRkfNltC0EdLWFltCZ2JYSEshAXOYUBYp3tCZ04JERbCAufQEVZSRW51fkZYCAuco6Sw3r5Omigrh92pzs8IC2GBc1QQVhbJDaBDnZ8RFsIC5yi/JUzda87RkCudnxEWwgLnuN16WAgLYYFzICyEhbDAGRAWwkJY4AwIC2EhLHAGhIWwEBY4A8JCWAgLnAFhISyEBc6AsBAWwgJnQFgIC2GBMyAshIWwwBkuE5a6MphV5cqRRqoIC2GBc1wirJiRksJyqJEqwkJY4BzVhfVUp+/163S5PqcaqSIshAXOUVlYb1+LfzLqi7rVSBVhISxwjorCetZVVkFkSiQjrCIQFuhTSVjiHlFPWk80oUBYRSAs0KeCsOK6yhCWa30J/3NNfQm3pgascLQvocEfeIGwPvrhewbHrPsrC6YpLaykdq4urGt3fjbYiLhAWNfo/Pxvv/bVawvrO1/6JePDpvMz6FNWWF8Er55obIWl+y7PsCVkSwjOUU5YKV0Rw0JYVUFYoE8pYWWngyaz2TklRFhFICzQx6CwaKSKsIpAWKDPxZefs9ZTNFJFWPkgLNDHqLBopIqw8kFYoI9hYUVXLNaAsJ5AWAjrZqEeFsJCWOAMCAthISxwBoSFsBAWOAPCQlgIC5wBYSEshAXOgLAQFsICZ0BYCAthOUMiz9FYzpDBusCFnI7/kn8OYSEshFUHn/70b5d85LxBZlK2IcXUIKzsnPLKzkVYCAth1YGmsJ7me7LC09XXRMZ4+zqzBURVZSEshIWw6kBPWAZrCNjDJYWnEBbCQlh1YERY5yd38c04VdhOvezpHXOK2Z29Zxff6FVe7V1dWInh5/xLdH5GWFkgLJ0toZpVBfPpfBtjEdarV6mvZgir5LuVMELxcK+0JSwXM6PzM8LKA2HpBd1PpmDGLM+Y/6l12RdvkbX0ij95/t0yujxUmuiXlU6vJKx0Tffs5+j8jLDSICxNYUVRckUQ10lGGXP1evW6J2Hlbe0SheyK302vV8OlQTmNGFZqwHR+RlgFICwDwnoivVIqrAqsZl9e34XkF6q82yXaubzPg4awkt88Nd0RVhEIy5ywoii5n2lCWNFlQffcZV4ZLhVWxsKJrjkIqwiEZVZYpzOr3AatmrDKz9lnb53/G1q2iqoJK6nd03+0rkaqF/Tv/VkWf/DZ92sQ1p9428x/XbisHTGdn13s/Hw1YT3NuFwX5f6Noi+UercTykxzXVtFesJqnTtWiH/B2Arr9w3xk1qE9emP3pgasKKezs/Gh/1Hn3z873/1K0Yen/zdX/zNv/wLmY/vf/ebBses+ysbQ0tYn795ld0YNB1QT8zAt69LeSj1hfPv9vZ1qQ1W7ngvQ7Ome2wAdH5mS1jI//sf/93IsH/2lS+vf/Ev5o38P/6rlfGRG0FfWFmcTLec1KOLhHX+3bK+nm+jvHdrVXSDTqZ7Io5FDAthFXHjwtIl5azsGZUUQ1YjvnLCOv9up0MqtRtsVFiJtROnhAirCIQF+mgJK7F2ovMzwioAYYE+JYX1+ZtXWfG3hKDo/Iyw8kFYoE8VYWWReSXpzIsuBWEJCAth3SxVtoRJG2V7iM7PCCsThAX6UA8LYSEscAaEhbAQFjgDwkJYCAucAWEhLIQFzoCwEBbCAmdAWAgLYYEzICyEhbDAGRAWwkJY4AwIC2EhLHAGhIWwEBY4A8JCWAgLnKGasE5vE9L5GWFVAGGBPnR+RlgIC5zh4s7PWaWu6PyMsPJBWKCPTgwrWWGUzs8IqwCEBfoYFBY13RFWEQgL9NEQVtJEdM1BWEUgLNDncmElF1R1dX4uaKRcCRs6P19GDY1Uf/grXzc/7E8+qUFY629+w+CYL54dVyJx9GXsBN5g4ObK/9ilwkrrybXOz3/0ycem5s8/fzXImz+/9+GHpgascLfzcx3C+sbC4Jh1f2Vj/Kfxl0s+ct4g85zekGJqE1bsm6hTWFm7PNc6PxvcoRQI63//1/9iasAKtoQubgk1hfU00+PT6PM3r2paExkhljHw9nWdwnr60eV0iXUmhoWwEFad6AnLYHvPpnj7Wo2/RmHl2Spy7pQQYSGsOjEirPOTvPieiTKFetnTO+asNs7eWonvU8sbqC5hFdjqiy+70vkZYSGsOtHcEip1FMyk8/dMxBSvXqW+miGsku+W98Ui6hBWOos9ZxwtRzo/IyyEVSfaQfcTP2RMqIylQWpd9sVbZHZALj5DS7xbRpqARcLKuUqY9KpDnZ8RFsKqE31hRVFy2ROfWNkSkNcnciVzt3aJlUbxu2kcptkjrMidzs8IC2HViRlhPZFeKWVv4JIzNO9gLPmFKu92wSSv95SwMRCWgLBuXlhRlAzSNCGsyPage8MgLAFhIawoik5Pucpt0KoJq6KByv8NhHUBCAth1cnVhBXPbTq3OSsrrHLvdkIVxyGsC0BYCKtOtIT1+ZtXebHiZEA9YZlYumZUQVgl3u3t64zNYTnFIawLQFgIq070hZXFiSDyTsYuEdb5d8v6epmkp2p/KwnCQlgIywVSzspeoSS1cPqqKsI6/26nQyoXP0NYl4KwEBY4B8JCWAgLnAFhISyEBc6AsBAWwgJnQFgIC2GBM1wgrHOleRzp/IywEBY4R0VhnSvJ7FDnZ4SFsMA5ygurRElmpzo/IyyEBc5RXljnSzK71fkZYSEscI6Lgu5F1b2o6Y6wskFYoI9BYdE1B2EVgbBAH3PCqqvzs6kemQYbERc1Un2gkerzsGvp/PxbX/07pgZsYednsFdYaWSFZaoL+Z/98R/XIawPPzQ14C9Gfv0V1ne+9Evmh23uB17c+dngmHV/ZcE07glL912eYUvIlhCcgxgWwkJY4AycEiIshAXOYFBYdH5GWEUgLNDHpLDo/IywCkBYoE+1TPezFU7p/Iyw8kBYoI9hYUV0fkZYOSAs0Id6WAgLYYEzICyEhbDAGRAWwkJY4AwIC2EhLHAGhIWwEBY4A8JCWAgLnAFhISyEBc6AsBAWwgJnQFgIC2GBMyAshIWwwBkQFsJCWOAMVxAWnZ8RVhYIC/QxLCw6PyOsPBAW6GNUWHR+Rlj5ICzQx6Sw6PyMsApAWKCPQWFR0x1hFYGwQB+DwqJrDsIqAmGBPuaEVWPn5399Ke+f8vHiHxl5/M6vzfMe8u9+73vfu3jMaUwN++zIzQ7bxZG/e/fO1PwAI9grrEw++OADg319a4Nh14yRkWMrC3FPWAbepXYYds24O3IoxqUYVuTsLyLDrhl3Rw7FuHRKGDn7i8iwa8bdkUMxdeVhGbqg4+gvIsOuGXdHDsUYzXS/cufnyNlfRIZdM+6OHIoxfJfwqp2fI2d/ERl2zbg7cijGfLWG63V+jqLo448/Nvl2dcGwa8bdkUMxLtXDAoAbB2EBgDMgLABwBoQFAM6AsADAGRAWADgDwgIAZ0BYAOAMCAsAnAFhAYAzICwAcAaEBQDOgLAAwBkQFgA4A8ICAGe4OWH5vt/0EC4hCILVarVcLlerVRAETQ+nAtvtdrlcPjw8uDVssJPbEtZms2m1Wuv1uumBVOPx8fHu7k7VROz1evv9vulBnScIgtFopIZ9d3fnxLDBZm5LWP1+XyaPQ87a7XbtdrvVak0mk/l8LubqdrvH47HpoRURhqH8tAeDQXzYYRg2PTRwmBsSVhiG7Xa72+265SyZ9o+Pj/LHIAgGg0Gr1ZrP580OrJj5fN5qte7v7+WPQRDIT3673TY7MHCaGxLWbreTCbNcLl1xlud5rVZrNpvFn9zv961Wq9PpNDWqs4Rh2Ol0BoNB/MnVauXEzxxs5oaE9fDw0Gq1JPTrirPu7+9brdZut0s8L7Ehaw8QRKmJn+12u5Unp9PpcDicTqfWjh+s5YaEtVwu+/1+/I/2O+t4PE4mk/TzIl+bt1ez2SwRZZtOpxKMU3Q6ncPh0NQIwUVuSFhRFCWmhxPOyuTx8dGtYa/XazGU5Dc8Pj4Oh0MJyTc9NHCJ2xJWmrSz9vv9ZDKx/DBLYlsPDw/qGd/3R6ORnQsW0Wu/348PLwxDOTpkYwjluXVhRafO2u/3nU6n0+lYPovkAGG5XMoffd+XMzg711y+708mk3Ti6HQ6bbVanuc1MShwEoQVRTFnia3sz2/0fV8JS9lK+csVer1eu922fDELVoGwnpjNZiIs+20VxYTlrq0kqpV5pACQB8KKoihSO0EnbBU9C2s6nTpqq9VqJUm8XDCESrxkYU2n03hYOg/bbLVer4fDYfFrRFiCJbbyfX8wGBRfGJIr3JK73+12LfmBg0O8WGEdj0e5cHs2RLJareyxVRRFcvOmOMcqCALJabLEVlEULRaLsxeG9vu9DHs2m7G2ggt4scKKomg8HifO/p1AMsLPLrI2m41V39rxeGy32+12u3iR5fu+5de2wWZesrDkgkiZRZZtyKbJnkVfSRIXngGM85KFFT0vsuzMTipA7gmPx+OmB1INWWS5+AkBrvCihJVOQZRFVvwKoYXs9/vEDFdZ4DYvso7HYzq9VhZZVu1V4SXxcoQliVTdbjexnpJFlrX3hKUI6t3d3XK5jMeh5XrzdDptcGwFHA4HUWqi6IJaZDU3NHjJvBxhrVYrVZzv7u7u4eFBli2WL7I8z5NjQUlbnc/nEpOWRdbZGHZTHI9HuVgjTCYTtRiURZa1nxDgNK4KazabqeCu1FeS/95sNqoOslq2yCLLhjtr6/Va3ax+fHzsdruyPNntdjLIVqvVbrdl2SKLLBsqix4Oh/F4LEOV3PrNZiP/PZ/PO52OjHw8Hu/3e1lkWfsJAU7jpLB831dZSPI5PxqN4i/wPE/N/06nI+XubIhh93o9Ge12u5VU7/h+yvf92WymikbJt2DDIktttz3P63a77XZblWyOoigIgvv7e9UmYzgcymcGiywwjpPCiqLo8fFRTezRaJR5LOX7fqJoXOMxbHX1T+Z/Zk2IIAiWy2W8TU7j2aFhGKr+NwlbxV+zXq/Vd1cmlQygKq4KK3ouE3x2Ph+Px+VyKdsWGxZZcum3wLNCfP7bkChwOBxE/XmeVWy3WynOZ8MnBLwwXBWWZCqNRqOSN1QsSRSQad/tdsVExc4SLMnXl1Iwcj5w1lnRs5dt+ISAl4SrwpJrtFFsb3jWWVL0qvEY9sPDg+/7am941llSrrPxRdbj46PneWpveNZZlnxCwAvDVWHFyXSW53mJ67VyetXr9eoeXw6Zzjoej+kyx1bd1MlzVjqwJdehuakDBnFMWKvVajgcttvt4XAoKyxBOWs+n4dhKG0708XhlstlI8kNu91uOBz2er1+vx9PEFXOGgwGh8MhDMPJZJLOulyv141M+yAIFovFcDjsdruz2Ux1G4s7S56UDWBCtZKr1Xj0DV4SzggrCAIVZY+fQ6kjf+WsbrcrmxFLjtUlnSrO3d2dmvy+70uug5Q6aFlThNPzvPhJpYxQfUjEzw1l/LShhxpwRliSb7VYLGRWqBO0Xq+n5sl+v5fJ0+l0LLnwLDdvZAEVRZHneXKC1m63lbOCIFDHapYsSY7HY6fTubu7UwmikoqV2OJJUnur1er3+5a37YCXgRvCksBz4mJdEAQS3Ek8n+6T3BQy7eNKFWSeJwoEHw4He+a8rJ4SP0mVkBHfVh+PR3t+4PDicUNYMsPT0ejj8SjbFjv78UkpvnisTSFLqsaTFfJopS4PCPf392SEQoO4ISz5wM+0kkwhO4+iZGyZwpIr2ZlSaBwpGJ8XSpMr2RQ4hkZwQ1hyQJ4586UHcuPZVZnI2PJmfrfbtfOGcBiG0pUjM5omwUR7dq9wU9grrHigRGZ+ZkNmiWpnuqwR9vu9Wn2o5Mn0eWUQBPYcCEapanyTySQdHBQGg0G73a5vZAAxLBWWfIzH57k80+124xtDybe6u7trvJ6BIGHp+HJPwljpC8Py7WTeIq4fSQfrdrvxZ+T2ZWLpKh8P1pYVhBePjcKSyZyYFWEYyplgp9NZLBae5202G1m/yNF744it+v1+Ir6jzv5ns5nneY+PjxKSs2Tai63SSvU8T/LChsPhdrv1PE825ulDT4DasEtY8YwkSV+KT/4wDONVLq3Kt5L4usoLTeTTp3NHZ7OZDdN+t9up7NB2u504tYx/Vf0fIXoFDWKXsMbjcbvdXi6XKi80fY622+3m8/l4PF4ul5bsBMVH/X5fbg6JsxJjOxwO9/f3w+FwsVhYshOU0hFSl1UVDkssV4/H42q1Go/HJdtoA1wVi4Ql8ZH4ikkmvyWXfvOQJszx8LlsnRqvuneWwWAQT17d7XYti4vfA0RWCUsuf8Q3SlL0ypIrgXlIWD3u2cPhYE+IKg85pkwMst/vdzqdpoYEcBaLhCXB6fh2SZYqlgdNRFiLxUI9I0kYlm+gwjBMrKck/crOXFYAwSJhqWQrKXEn/prNZlEUhWG4XC673e5gMLAkyq5Q/bikbsxms5EUAdlqSRefbrcbN5olSC1TaYez3++lfKtcDDwcDpPJZDgcTiYTSwKFAJFVwoqei4IqxuNxGIbH41F17hNsaNgVR1rgqOH1ej2Ju6kKB4Jt94fUTUx1SigfBuv1Ov7tDAaDpkcK8ESTwtrtdsvlcrlcxsPq2+1W0qzFSofDQbKEZIdlQz9k6Ri4XC7jwbXD4SBLQqkgGIahrF+m06nUM5BS7g0OOwiC9Xq9XC43m40KFEqHLikpIRm58hPu9Xq73c73ffmosPzcA26HZoQVBEEio2o8HqvjKrkYPJlMVquVXGqLL6kycx1q4/7+PrGYimfedzqdwWCw3W5lnscPCqVQagMjjqIoina7nVQKEzqdTuIWQbvd3mw28j8lnv4m/rJtSQs3SzPCmkwm7Xb7/v5eEtZVmWD1gnj6aPzjXeJcTYWxVKueeMJ6p9NRUZ54+mg86C7x7KZuDkrf2W63KwnrKvNeXcCUhAa1AYwf1EpmnA05rgBRI8JKX1dWZTnVM0EQPDw8iLbiT3a73aauhkgPi3jfqiAIZAEYD0tvNpv0cacIuqlCd6PRKDFI+cHG/xfI9rzT6cS32/L/xcLjArhZGhDWfD6Pb46kFnv6Cl70vGCRzYuUP263203V6pP0BbU5knqnnU4nHd+RelJyvnk8HmUh1lQ9CUlfkMEIsu/LzGuVijfyeSAHINTqA6toQFjj8VjVWkrbKgxDJQUJZsniq3Xau6F+JJoj66ZMW8WbysjpW7/fl/9osPqNZLGqogtpW+33e7VilYMCWcbK5pdCfWAVDQhLPro3m03m2urh4SFe0HK1Wkk7GTluq3+0CgmfzWazTFuJW1UkW10bHgwGjUesO52OtLTJXFv1+321/lLrwbu7O9uSMACiqwprPp+rOM5sNlOzQkK8nU4nbSvJDGr2Ottms1Fz9fHxcTgcqgWIOKjb7aZ3ghKcblCp0thGhur7/nA4VCOUNBE52UjYSqJUliflAyiuJSzpcyNVluSDPR5GUQmi8S1eGIaN33YOw1A1kZYFYLfbVRqSRVZ62su302xwWqw0Go1U5ppa2akE0cQnwX6/b7fbiWNBAJu54gornraeTvWUcIncaPE8b7vdStyk8U971ZC1lerGHsW+qel06nme53myh4q3m28E1fSslVXg1PM8qSCqqvHJ1juz6jSAtVw3hqWmUGYFqMRFnEQ2Y4OogWX2tthsNjL5FZLdXv84E8TPKNLjORwO6n+Hehm2Are4+gpLJkn6M1/Y7/cPDw/T6XS1WllyyVau0ch95rzjf9/31+v1dDpdLpeWtBENw1B2grL7y1zxhWG43W5ns9l8Pl+v1zZIFqASVxTW4XCQsI6YK89ZtiHXhnzfV3tD+0vxCRJ3kxrtNuxSAYxTU1pDprPsbNccJ9NZx+PR8uykPGexAQTXMS+s/X6/2Ww2m01iVitnyU3AIAikmrjxAVyG7/ue56V3pspZKlA1Go3syf+WPNvVapWwv3LWcDiU70hCb5arFqAYk8JK12BIJB+qYLZKAbdkk5iowTCdTuMLE+UslQJuyfU6ua6UF0RXzup0OhJJlPTR5sYLoItJYckBv3TfkwuDrdP0qyiKNpuNPJ9uKtUUcmNxOByu1+uHhweVshSf2/v9XiZ/WmdNoXre3N/fr9drSWHrdDqJRrOq7kWv12NLCK5jTFhSeiVe+EWeSe+egiDwPM+SySPTPl6DQS7fJcobCJ7n2VPKbjAYJJqJiVLTbWV3u53neWwG4QVgTFij0SheUXO/38tOxPJ5Ilea1aqkoAaDVRyPx8RRQEENBoAXgzFhSWUS+e+0raQ0u6l/yyBSdl2We5m2smQlmEAuCakiEGlb2TlsAE1MrrBk5meuraTnjal/yyCyb12tVgycWd0AAAUmSURBVHk1GBqswFWAlNySnWzaVlLfxrb2QgD6GBPWer2Wg6q0reTybTxOZA8y86VEhIU1GAqQ88F08fjoeZ9ryT0nAINcLqzD4eB5Xrrwbrvdju9HbKjBEEdC/vFFk0q2SISr5Xl7ykLt9/v4sD3Pk/PWxCeBrArtyRQDMMglwgrDUIqZJJKtfN+XW8G9Xk8+3u2pwSBIiQIZ9mQyUctA1U5C9oa+78s+y5I2yIfDQeVb9ft99XkgKylJavV9PwgC6TN0d3dHDAteJJWFFYahZCFKW2CZ/6p6zPF4jDe8iae2N470huj1etPpVCVbibPCMFS9ZPLSR5tCVlLSdEclgqrlarp0xGAwsDDoBmCEysKSia0ctNvtZMIkuq1Mp9PhcLhYLCyZPNJCYjKZiIOOx6NoNx5u2+128/l8OBzOZjNLAkAS/lNluVSZ47izfN9fLBbD4XA0Gj08PNggWYArUU1Ykv4TT15X9z9aTTdkLqbX693d3anJHIahbAMTzrKNxWLROq3LKocbCWcB3Ai5wjocDrPZrNfrxaPOkgSg5ok0CpQOnel1ViNI7/XhcBjf0Iln43E01es4vc5qis1mMx6PR6NRPPzU6/Xi4XNZJy6Xy/Q6C+AWyBaW9KqR8/7xeByf+fHl1Wg0UvFdVe6yQWepXjVyTBbfjc7nc3WgKbFqORMU5zbrrPiNv8FgEO8Jtl6v1dmlHP+pn7/UmMZZcFNkCEs6qXQ6nfSttDjyaa9iPUEQtFotKXrZyBGVNGSXBUiBeoIgiE/7KIqGw6E4q6nDAbHVcDgs/rmNx+N4uYXlcikN0Cw5ygSogaSwJMpbpjeBZDaoP0rzrsPh0FSUvWSDZdGx6igThmGv11utVk2tU2S5N5lMil8mu9p4WZvZbCY9chrfzALURlJYcghYplOxrAtUJ2TZHl5ljCWQu3VlkuklaK1mvmSHNiVZ6SqWKLqQiWTkDwYD+aMUmeCqM9waSWGpK4Fn/6YsVST6IxH3BlMBZJ1SZk93PB5l59jv9yXinqjYVScS+Ct5aUlu4UhUURLKyGCAWyMpLAlal5wJ6lJLp9NpNjtUii6UHIM60xRbNTjtJQ5Y8pjC9/3MfHeA2yEpLNnonV0rqS2MXM27xsgqIeo8u1YKgkA1c09chGwECfz1er2zr1QZ+VYVEQSomaSwpF7w2U3KZDLJbDLaFDLz46mhmazXa9s6s8uStri54fF4TNQ+BrhNksKSAsHF26swDKWGzHWHVhGZ+cXbK4n+NL6wiiOb2eKAlIQLi7NMAG6BjDws1Y8rb+sh+e62HVHJQWErvzKEnKypgzZLUJmreZkN6ra5VZ4FaITsTHfVgiX9qS751naWtVOHAOntahAEcspmya3mOLvdTg4uR6NROqlKrhM2eJQJYA/ZwlLFDOSTXya57/uqf5+12xPVGHE4HMogwzDcbDayYbR22qvuZ91uVzVz3e/3kmXS7XbJDgWICi4/Z5aIKnNlp3HW63W8K6pisVhYFW5PEG99GCfRHhXgljlTXsbzPFXurtvtTiYTC3eCafb7/Ww2U+XuhsOhJS2miwmCYLFYqLVtv9+3p0AzgA2Y7PwMAHBVEBYAOAPCAgBnQFgA4AwICwCcAWEBgDMgLABwBoQFAM6AsADAGRAWADgDwgIAZ0BYAOAMCAsAnAFhAYAzICwAcAaEBQDOgLAAwBkQFgA4A8ICAGdAWADgDAgLAJwBYQGAMyAsAHAGhAUAzoCwAMAZEBYAOMP/BycdqbkuKiuzAAAAAElFTkSuQmCC" alt=""><br><br><br>Also I would like to be able to change the colors of the bars for each series.<br><br>Thanks,<br>Mike<br><br><br>

Hi Mike,

I have worked with the code snippet shared by you and have also observed the source and desired chart. Actually, you are using ClusteredColumn3D chart and you are trying to convert that to ClusteredColumn. I regret to share that at the moment the chart type changing property is not working and an issue with ID 29014 has already been created to resolve the issue in next product version. This thread has also been linked with the same issue so that you may be notified when the fix is available online. Secondly, use the following statement instead of commented one and you will observe a noticeable change and it may help you for the time being.

//chart.Rotation3D.RotationY = 90;

chart.Rotation3D.RightAngleAxes = true;

Thanks and Regards,

Thank you for your reply that did help me. Also is there a way to change the colors of the bars for each series?

-Mike

Hi Mike,

Please use the following code snippet for changing the chart bar lines. The chart bar lines are associated with chart series so access the desired chart series and apply the changes.

series.Format.Fill.FillType=FillTypeEx.Solid;

series.Format.Fill.SolidFillColor.Color=Color.Blue;

Thanks and Regards,

Hi Mike,

I like to share that the issue of modifying chart type has been resolved in Aspose.Slides for .NET 5.4.1. You may please download the specified product version from the attachment of the thread post shared here.

Thanks and Regards,

The issues you have found earlier (filed as 29014) have been fixed in this update.