0 \wedge x+3>0\wedge x-5>0\\ x>-13 \wedge x>-3 \wedge x>5\\ D\in(5,\infty)\\\\ \log_5(x+13) <\log_5(x+3)(x-5)\\ x+13<(x+3)(x-5)\\ x+13<x^2-5x+3x-15\\ x^2-3x-28>0\\\\ \Delta=(-3)^2-4\cdot 1 \cdot (-28)\\ \Delta=9+112\\ \Delta=121\\ \sqrt{\Delta}=11\\\\ x_1=\frac{-(-3)-11}{2\cdot 1}\\ x_1=\frac{-8}{2}\\ x_1=-4\\\\ x_2=\frac{-(-3)+11}{2\cdot 1}\\ x_2=\frac{14}{2}\\ x_2=7\\\\ x\in(-\infty,-4)\cup (7,\infty)\\\\ x\in((-\infty,-4)\cup (7,\infty))\cap (5,\infty)\\ \underline{x\in(7,\infty)}" alt="\\\log_5(x+13) <\log_5(x+3) + \log_5(x-5)\\\\ x+13>0 \wedge x+3>0\wedge x-5>0\\ x>-13 \wedge x>-3 \wedge x>5\\ D\in(5,\infty)\\\\ \log_5(x+13) <\log_5(x+3)(x-5)\\ x+13<(x+3)(x-5)\\ x+13<x^2-5x+3x-15\\ x^2-3x-28>0\\\\ \Delta=(-3)^2-4\cdot 1 \cdot (-28)\\ \Delta=9+112\\ \Delta=121\\ \sqrt{\Delta}=11\\\\ x_1=\frac{-(-3)-11}{2\cdot 1}\\ x_1=\frac{-8}{2}\\ x_1=-4\\\\ x_2=\frac{-(-3)+11}{2\cdot 1}\\ x_2=\frac{14}{2}\\ x_2=7\\\\ x\in(-\infty,-4)\cup (7,\infty)\\\\ x\in((-\infty,-4)\cup (7,\infty))\cap (5,\infty)\\ \underline{x\in(7,\infty)}" align="absmiddle" class="latex-formula">
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\log_4(1-x) + \log_4(8-x)\\\\ x+32>0 \wedge 1-x >0 \wedge 8-x>0\\ x>-32\wedge x<1 \wedge x<8\\ D\in(-32,1)\\\\ \log_4(x+32) > \log_4(1-x)(8-x)\\ x+32>(1-x)(8-x)\\ x+32>8-x-8x+x^2\\ x^2-10x-24<0\\\\ \Delta = (-10)^2-4\cdot 1\cdot (-24)\\ \Delta=100+96\\ \Delta=14\\\\ x_1=\frac{-(-10)-14}{2\cdot 1}\\ x_1=\frac{-4}{2}\\ x_1=-2\\\\ x_2=\frac{-(-10)+14}{2\cdot 1}\\ x_2=\frac{24}{2}\\ x_2=12\\\\ x\in(-2,12)\\\\ x\in(-2,12)\cap(-32,1)\\ \underline{x\in(-2,1)}" alt="\\\log_4(x+32) > \log_4(1-x) + \log_4(8-x)\\\\ x+32>0 \wedge 1-x >0 \wedge 8-x>0\\ x>-32\wedge x<1 \wedge x<8\\ D\in(-32,1)\\\\ \log_4(x+32) > \log_4(1-x)(8-x)\\ x+32>(1-x)(8-x)\\ x+32>8-x-8x+x^2\\ x^2-10x-24<0\\\\ \Delta = (-10)^2-4\cdot 1\cdot (-24)\\ \Delta=100+96\\ \Delta=14\\\\ x_1=\frac{-(-10)-14}{2\cdot 1}\\ x_1=\frac{-4}{2}\\ x_1=-2\\\\ x_2=\frac{-(-10)+14}{2\cdot 1}\\ x_2=\frac{24}{2}\\ x_2=12\\\\ x\in(-2,12)\\\\ x\in(-2,12)\cap(-32,1)\\ \underline{x\in(-2,1)}" align="absmiddle" class="latex-formula">