[{"content":"","externalUrl":null,"permalink":"/","section":"","summary":"","title":"","type":"page"},{"content":"","externalUrl":null,"permalink":"/about/angie/","section":"About","summary":"","title":"","type":"about"},{"content":"","externalUrl":null,"permalink":"/about/mike/","section":"About","summary":"","title":"","type":"about"},{"content":" My Name # My Life Purpose # ","externalUrl":null,"permalink":"/about/","section":"About","summary":"My Name # My Life Purpose # ","title":"About","type":"about"},{"content":" Apples # Are good\nhere is a list with bullets Math Sample # The quadratic formula is \\(\\frac{-b \\pm \\sqrt{b^2 - 4ac}}{2a}\\), and a simple inline fraction is \\( E = mc^2 \\).\n$$ \\int_{-\\infty}^{\\infty} e^{-x^2} dx = \\sqrt{\\pi} $$ Photos of Apples # This is a paragraph.\nScrappy2 caption This is another paragraph.\nScrappy caption Yes again.\nScooby caption ","externalUrl":null,"permalink":"/posts/2026/apples/","section":"Posts","summary":"Apples # Are good\nhere is a list with bullets Math Sample # The quadratic formula is \\(\\frac{-b \\pm \\sqrt{b^2 - 4ac}}{2a}\\), and a simple inline fraction is \\( E = mc^2 \\).\n$$ \\int_{-\\infty}^{\\infty} e^{-x^2} dx = \\sqrt{\\pi} $$ Photos of Apples # This is a paragraph.\nScrappy2 caption This is another paragraph.\n","title":"Apples","type":"posts"},{"content":"","externalUrl":null,"permalink":"/categories/","section":"Categories","summary":"","title":"Categories","type":"categories"},{"content":" Pears # a;lskjdf ;laksjdf ;laksjd f;\nas;dflkja;sd lkfj ;again\nMath Sample # The quadratic formula is \\(\\frac{-b \\pm \\sqrt{b^2 - 4ac}}{2a}\\), and a simple inline fraction is \\( E = mc^2 \\).\n$$ \\int_{-\\infty}^{\\infty} e^{-x^2} dx = \\sqrt{\\pi} $$ Photos of Pears # ","externalUrl":null,"permalink":"/posts/2026/pears/","section":"Posts","summary":"Pears # a;lskjdf ;laksjdf ;laksjd f;\nas;dflkja;sd lkfj ;again\nMath Sample # The quadratic formula is \\(\\frac{-b \\pm \\sqrt{b^2 - 4ac}}{2a}\\), and a simple inline fraction is \\( E = mc^2 \\).\n$$ \\int_{-\\infty}^{\\infty} e^{-x^2} dx = \\sqrt{\\pi} $$ Photos of Pears # ","title":"Pears","type":"posts"},{"content":"","externalUrl":null,"permalink":"/posts/","section":"Posts","summary":"","title":"Posts","type":"posts"},{"content":" silly little joke # The dyadic Green\u0026rsquo;s tensor $$ \\bar{\\bar{G}} (\\mathbf{r}, \\mathbf{r}') = \\left[\\mathbb{I} + \\frac{1}{k^2} \\nabla \\nabla\\right] \\frac{e^{\\mathrm{i} k |\\mathbf{r} - \\mathbf{r}'|}}{4\\pi |\\mathbf{r} - \\mathbf{r}'|} $$ should not be confused with the mysterious forest-dwelling dryadic Green\u0026rsquo;s tensor.\n","externalUrl":null,"permalink":"/posts/2026/puns/","section":"Posts","summary":"silly little joke # The dyadic Green’s tensor $$ \\bar{\\bar{G}} (\\mathbf{r}, \\mathbf{r}') = \\left[\\mathbb{I} + \\frac{1}{k^2} \\nabla \\nabla\\right] \\frac{e^{\\mathrm{i} k |\\mathbf{r} - \\mathbf{r}'|}}{4\\pi |\\mathbf{r} - \\mathbf{r}'|} $$ should not be confused with the mysterious forest-dwelling dryadic Green’s tensor.\n","title":"Pun about green's tensors","type":"posts"},{"content":"","externalUrl":null,"permalink":"/series/","section":"Series","summary":"","title":"Series","type":"series"},{"content":"","externalUrl":null,"permalink":"/tags/","section":"Tags","summary":"","title":"Tags","type":"tags"}]