"{\"version\":11,\"randomSeed\":\"f834a2b6adf0ac9a1406cfb1efd6ac0d\",\"graph\":{\"viewport\":{\"xmin\":2.222192254703281e-8,\"ymin\":-200.89533537743793,\"xmax\":117947463575.92812,\"ymax\":184.53977865882953},\"xAxisScale\":\"logarithmic\",\"xAxisArrowMode\":\"POSITIVE\",\"yAxisArrowMode\":\"POSITIVE\",\"xAxisLabel\":\"Frecuencia [Hz]\",\"yAxisLabel\":\"Fase [º]\",\"userLockedViewport\":true,\"squareAxes\":false,\"__v12ViewportLatexStash\":{\"xmin\":\"0.00000002222192254703281\",\"xmax\":\"117947463575.92812\",\"ymin\":\"-200.89533537743793\",\"ymax\":\"184.53977865882953\"}},\"expressions\":{\"list\":[{\"type\":\"text\",\"id\":\"28\",\"text\":\"Autor: Gonzalo Alba Muñoz\\ne-mail: gonzalo.alba@uca.es\\nORCID: 0000-0002-2360-7708\\nhttps://zenodo.org/communities/volt/\"},{\"type\":\"text\",\"id\":\"2128\",\"text\":\"DESCRIPCION:\\nEsta calculadora gráfica permite visualizar de forma interactiva el diagrama de Bode para la fase de la ganancia de tensión de las 6 salidas posibles en el circuito RLC serie.\\nINSTRUCCIONES:\\n1. Defina los valores de R, L y C. \\n2. Active la/s salida/s en el selector 'OUTPUT'.\\n3. Use los cursores para realizar mediciones.\\n4. Use Reset si algún cursor se le pierde fuera de la interfaz gráfica\"},{\"type\":\"text\",\"id\":\"2024\",\"text\":\"DESCRIPTION: \\nThis interactive graphing calculator visualizes the Bode phase plot for the 6 possible outputs of a series RLC circuit.\\nINSTRUCTIONS:\\n1. Set the R, L, and C component values.\\n2. Activate the desired output(s) via the 'OUTPUT' panel.\\n3. Drag the interactive cursors to take measurements.\\n4. Use 'Reset' if a cursor disappears from the visible graph area.\"},{\"type\":\"folder\",\"id\":\"2052\",\"title\":\"(Salida R)\",\"collapsed\":true},{\"type\":\"expression\",\"id\":\"2046\",\"folderId\":\"2052\",\"color\":\"#388c46\",\"latex\":\"N_{um}\\\\left(s\\\\right)=Rcs\",\"hidden\":true},{\"type\":\"expression\",\"id\":\"1993\",\"folderId\":\"2052\",\"color\":\"#000000\",\"latex\":\"N_{c}=\\\\left[\\\\frac{N_{um}\\\\left(0\\\\right)}{0!},\\\\frac{N_{um}'\\\\left(0\\\\right)}{1!},\\\\frac{N_{um}''\\\\left(0\\\\right)}{2!},\\\\frac{N_{um}'''\\\\left(0\\\\right)}{3!},\\\\frac{N_{um}'''\\\\left(0\\\\right)}{4!}\\\\right]\"},{\"type\":\"expression\",\"id\":\"2004\",\"folderId\":\"2052\",\"color\":\"#6042a6\",\"latex\":\"N_{real}(x)=N_{c}[1]-N_{c}[3]\\\\cdot x^{2}+N_{c}[5]\\\\cdot x^{4}\",\"hidden\":true},{\"type\":\"expression\",\"id\":\"2006\",\"folderId\":\"2052\",\"color\":\"#6042a6\",\"latex\":\"N_{im}(x)=N_{c}[2]\\\\cdot x-N_{c}[4]\\\\cdot x^{3}\",\"hidden\":true},{\"type\":\"expression\",\"id\":\"1991\",\"folderId\":\"2052\",\"color\":\"#388c46\",\"latex\":\"D_{en}\\\\left(s\\\\right)=lcs^{2}+Rcs+1\",\"hidden\":true},{\"type\":\"expression\",\"id\":\"2001\",\"folderId\":\"2052\",\"color\":\"#000000\",\"latex\":\"D_{c}=\\\\left[\\\\frac{D_{en}\\\\left(0\\\\right)}{0!},\\\\frac{D_{en}'\\\\left(0\\\\right)}{1!},\\\\frac{D_{en}''\\\\left(0\\\\right)}{2!},\\\\frac{D_{en}'''\\\\left(0\\\\right)}{3!},\\\\frac{D_{en}'''\\\\left(0\\\\right)}{4!}\\\\right]\"},{\"type\":\"expression\",\"id\":\"2005\",\"folderId\":\"2052\",\"color\":\"#6042a6\",\"latex\":\"D_{real}(x)=D_{c}[1]-D_{c}[3]\\\\cdot x^{2}+D_{c}[5]\\\\cdot x^{4}\",\"hidden\":true},{\"type\":\"expression\",\"id\":\"2007\",\"folderId\":\"2052\",\"color\":\"#6042a6\",\"latex\":\"D_{im}(x)=D_{c}[2]\\\\cdot x-D_{c}[4]\\\\cdot x^{3}\",\"hidden\":true},{\"type\":\"expression\",\"id\":\"1979\",\"folderId\":\"2052\",\"color\":\"#000000\",\"latex\":\"G_{dB}\\\\left(x\\\\right)=20\\\\log\\\\left(\\\\frac{\\\\sqrt{N_{real}\\\\left(f\\\\right)^{2}+N_{im}\\\\left(f\\\\right)^{2}}}{\\\\sqrt{D_{real}\\\\left(f\\\\right)^{2}+D_{im}\\\\left(f\\\\right)^{2}}}\\\\right)\\\\left\\\\{O=1\\\\right\\\\}\",\"hidden\":true},{\"type\":\"expression\",\"id\":\"2142\",\"folderId\":\"2052\",\"color\":\"#000000\",\"latex\":\"G_{dBF}\\\\left(x\\\\right)=\\\\frac{180}{\\\\pi}\\\\left(\\\\arctan\\\\left(N_{im}\\\\left(f\\\\right),N_{real}\\\\left(f\\\\right)\\\\right)-\\\\arctan\\\\left(D_{im}\\\\left(f\\\\right),D_{real}\\\\left(f\\\\right)\\\\right)\\\\left\\\\{O=1\\\\right\\\\}\\\\right)\"},{\"type\":\"folder\",\"id\":\"2166\",\"title\":\"(Salida LC)\",\"collapsed\":true},{\"type\":\"expression\",\"id\":\"2167\",\"folderId\":\"2166\",\"color\":\"#388c46\",\"latex\":\"N_{umLC}\\\\left(s\\\\right)=lcs^{2}+1\",\"hidden\":true},{\"type\":\"expression\",\"id\":\"2168\",\"folderId\":\"2166\",\"color\":\"#000000\",\"latex\":\"N_{cLC}=\\\\left[\\\\frac{N_{umLC}\\\\left(0\\\\right)}{0!},\\\\frac{N_{umLC}'\\\\left(0\\\\right)}{1!},\\\\frac{N_{umLC}''\\\\left(0\\\\right)}{2!},\\\\frac{N_{umLC}'''\\\\left(0\\\\right)}{3!},\\\\frac{N_{umLC}'''\\\\left(0\\\\right)}{4!}\\\\right]\"},{\"type\":\"expression\",\"id\":\"2169\",\"folderId\":\"2166\",\"color\":\"#6042a6\",\"latex\":\"N_{realLC}(x)=N_{cLC}[1]-N_{cLC}[3]\\\\cdot x^{2}+N_{cLC}[5]\\\\cdot x^{4}\",\"hidden\":true},{\"type\":\"expression\",\"id\":\"2170\",\"folderId\":\"2166\",\"color\":\"#6042a6\",\"latex\":\"N_{imLC}(x)=N_{cLC}[2]\\\\cdot x-N_{cLC}[4]\\\\cdot x^{3}\",\"hidden\":true},{\"type\":\"expression\",\"id\":\"2175\",\"folderId\":\"2166\",\"color\":\"#fa7e19\",\"latex\":\"G_{dBLC}\\\\left(x\\\\right)=20\\\\log\\\\left(\\\\frac{\\\\sqrt{N_{realLC}\\\\left(f\\\\right)^{2}+N_{imLC}\\\\left(f\\\\right)^{2}}}{\\\\sqrt{D_{real}\\\\left(f\\\\right)^{2}+D_{im}\\\\left(f\\\\right)^{2}}}\\\\right)\\\\left\\\\{O_{3}=1\\\\right\\\\}\",\"hidden\":true},{\"type\":\"expression\",\"id\":\"2176\",\"folderId\":\"2166\",\"color\":\"#fa7e19\",\"latex\":\"G_{dBLCF}\\\\left(x\\\\right)=\\\\frac{180}{\\\\pi}\\\\left(\\\\arctan\\\\left(N_{imLC}\\\\left(f\\\\right),N_{realLC}\\\\left(f\\\\right)\\\\right)-\\\\arctan\\\\left(D_{im}\\\\left(f\\\\right),D_{real}\\\\left(f\\\\right)\\\\right)\\\\left\\\\{O_{3}=1\\\\right\\\\}\\\\right)\"},{\"type\":\"folder\",\"id\":\"2186\",\"title\":\"(Salida RC)\",\"collapsed\":true},{\"type\":\"expression\",\"id\":\"2187\",\"folderId\":\"2186\",\"color\":\"#388c46\",\"latex\":\"N_{umRC}\\\\left(s\\\\right)=Rcs+1\",\"hidden\":true},{\"type\":\"expression\",\"id\":\"2188\",\"folderId\":\"2186\",\"color\":\"#000000\",\"latex\":\"N_{cRC}=\\\\left[\\\\frac{N_{umRC}\\\\left(0\\\\right)}{0!},\\\\frac{N_{umRC}'\\\\left(0\\\\right)}{1!},\\\\frac{N_{umRC}''\\\\left(0\\\\right)}{2!},\\\\frac{N_{umRC}'''\\\\left(0\\\\right)}{3!},\\\\frac{N_{umRC}'''\\\\left(0\\\\right)}{4!}\\\\right]\"},{\"type\":\"expression\",\"id\":\"2189\",\"folderId\":\"2186\",\"color\":\"#6042a6\",\"latex\":\"N_{realRC}(x)=N_{cRC}[1]-N_{cRC}[3]\\\\cdot x^{2}+N_{cRC}[5]\\\\cdot x^{4}\",\"hidden\":true},{\"type\":\"expression\",\"id\":\"2190\",\"folderId\":\"2186\",\"color\":\"#6042a6\",\"latex\":\"N_{imRC}(x)=N_{cRC}[2]\\\\cdot x-N_{cRC}[4]\\\\cdot x^{3}\",\"hidden\":true},{\"type\":\"expression\",\"id\":\"2191\",\"folderId\":\"2186\",\"color\":\"#6042a6\",\"latex\":\"G_{dBRC}\\\\left(x\\\\right)=20\\\\log\\\\left(\\\\frac{\\\\sqrt{N_{realRC}\\\\left(f\\\\right)^{2}+N_{imRC}\\\\left(f\\\\right)^{2}}}{\\\\sqrt{D_{real}\\\\left(f\\\\right)^{2}+D_{im}\\\\left(f\\\\right)^{2}}}\\\\right)\\\\left\\\\{O_{4}=1\\\\right\\\\}\",\"hidden\":true},{\"type\":\"expression\",\"id\":\"2192\",\"folderId\":\"2186\",\"color\":\"#6042a6\",\"latex\":\"G_{dBRCF}\\\\left(x\\\\right)=\\\\frac{180}{\\\\pi}\\\\left(\\\\arctan\\\\left(N_{imRC}\\\\left(f\\\\right),N_{realRC}\\\\left(f\\\\right)\\\\right)-\\\\arctan\\\\left(D_{im}\\\\left(f\\\\right),D_{real}\\\\left(f\\\\right)\\\\right)\\\\left\\\\{O_{4}=1\\\\right\\\\}\\\\right)\"},{\"type\":\"folder\",\"id\":\"2193\",\"title\":\"(Salida RL)\",\"collapsed\":true},{\"type\":\"expression\",\"id\":\"2194\",\"folderId\":\"2193\",\"color\":\"#388c46\",\"latex\":\"N_{umRL}\\\\left(s\\\\right)=Rcs+lcs^{2}\",\"hidden\":true},{\"type\":\"expression\",\"id\":\"2195\",\"folderId\":\"2193\",\"color\":\"#000000\",\"latex\":\"N_{cRL}=\\\\left[\\\\frac{N_{umRL}\\\\left(0\\\\right)}{0!},\\\\frac{N_{umRL}'\\\\left(0\\\\right)}{1!},\\\\frac{N_{umRL}''\\\\left(0\\\\right)}{2!},\\\\frac{N_{umRL}'''\\\\left(0\\\\right)}{3!},\\\\frac{N_{umRL}'''\\\\left(0\\\\right)}{4!}\\\\right]\"},{\"type\":\"expression\",\"id\":\"2196\",\"folderId\":\"2193\",\"color\":\"#6042a6\",\"latex\":\"N_{realRL}(x)=N_{cRL}[1]-N_{cRL}[3]\\\\cdot x^{2}+N_{cRL}[5]\\\\cdot x^{4}\",\"hidden\":true},{\"type\":\"expression\",\"id\":\"2197\",\"folderId\":\"2193\",\"color\":\"#6042a6\",\"latex\":\"N_{imRL}(x)=N_{cRL}[2]\\\\cdot x-N_{cRL}[4]\\\\cdot x^{3}\",\"hidden\":true},{\"type\":\"expression\",\"id\":\"2198\",\"folderId\":\"2193\",\"color\":\"#388c46\",\"latex\":\"G_{dBRL}\\\\left(x\\\\right)=20\\\\log\\\\left(\\\\frac{\\\\sqrt{N_{realRL}\\\\left(f\\\\right)^{2}+N_{imRL}\\\\left(f\\\\right)^{2}}}{\\\\sqrt{D_{real}\\\\left(f\\\\right)^{2}+D_{im}\\\\left(f\\\\right)^{2}}}\\\\right)\\\\left\\\\{O_{5}=1\\\\right\\\\}\",\"hidden\":true},{\"type\":\"expression\",\"id\":\"2199\",\"folderId\":\"2193\",\"color\":\"#388c46\",\"latex\":\"G_{dBRLF}\\\\left(x\\\\right)=\\\\frac{180}{\\\\pi}\\\\left(\\\\arctan\\\\left(N_{imRL}\\\\left(f\\\\right),N_{realRL}\\\\left(f\\\\right)\\\\right)-\\\\arctan\\\\left(D_{im}\\\\left(f\\\\right),D_{real}\\\\left(f\\\\right)\\\\right)\\\\left\\\\{O_{5}=1\\\\right\\\\}\\\\right)\",\"lines\":true},{\"type\":\"folder\",\"id\":\"2050\",\"title\":\"(Salida C)\",\"collapsed\":true},{\"type\":\"expression\",\"id\":\"2047\",\"folderId\":\"2050\",\"color\":\"#6042a6\",\"latex\":\"N_{umC}\\\\left(s\\\\right)=1\",\"hidden\":true},{\"type\":\"expression\",\"id\":\"2053\",\"folderId\":\"2050\",\"color\":\"#000000\",\"latex\":\"N_{cC}=\\\\left[\\\\frac{N_{umC}\\\\left(0\\\\right)}{0!},\\\\frac{N_{umC}'\\\\left(0\\\\right)}{1!},\\\\frac{N_{umC}''\\\\left(0\\\\right)}{2!},\\\\frac{N_{umC}'''\\\\left(0\\\\right)}{3!},\\\\frac{N_{umC}'''\\\\left(0\\\\right)}{4!}\\\\right]\"},{\"type\":\"expression\",\"id\":\"2054\",\"folderId\":\"2050\",\"color\":\"#6042a6\",\"latex\":\"N_{realC}(x)=N_{cC}[1]-N_{cC}[3]\\\\cdot x^{2}+N_{cC}[5]\\\\cdot x^{4}\",\"hidden\":true},{\"type\":\"expression\",\"id\":\"2055\",\"folderId\":\"2050\",\"color\":\"#6042a6\",\"latex\":\"N_{imC}(x)=N_{cC}[2]\\\\cdot x-N_{cC}[4]\\\\cdot x^{3}\",\"hidden\":true},{\"type\":\"expression\",\"id\":\"2057\",\"folderId\":\"2050\",\"color\":\"#c74440\",\"latex\":\"G_{dBC}\\\\left(x\\\\right)=20\\\\log\\\\left(\\\\frac{\\\\sqrt{N_{realC}\\\\left(f\\\\right)^{2}+N_{imC}\\\\left(f\\\\right)^{2}}}{\\\\sqrt{D_{real}\\\\left(f\\\\right)^{2}+D_{im}\\\\left(f\\\\right)^{2}}}\\\\right)\\\\left\\\\{O_{1}=1\\\\right\\\\}\",\"hidden\":true},{\"type\":\"expression\",\"id\":\"2143\",\"folderId\":\"2050\",\"color\":\"#c74440\",\"latex\":\"G_{dBCF}\\\\left(x\\\\right)=\\\\frac{180}{\\\\pi}\\\\left(\\\\arctan\\\\left(N_{imC}\\\\left(f\\\\right),N_{realC}\\\\left(f\\\\right)\\\\right)-\\\\arctan\\\\left(D_{im}\\\\left(f\\\\right),D_{real}\\\\left(f\\\\right)\\\\right)\\\\left\\\\{O_{1}=1\\\\right\\\\}\\\\right)\"},{\"type\":\"folder\",\"id\":\"2058\",\"title\":\"(Salida L)\",\"collapsed\":true},{\"type\":\"expression\",\"id\":\"2059\",\"folderId\":\"2058\",\"color\":\"#6042a6\",\"latex\":\"N_{umL}\\\\left(s\\\\right)=lcs^{2}\\\\ \",\"hidden\":true},{\"type\":\"expression\",\"id\":\"2060\",\"folderId\":\"2058\",\"color\":\"#000000\",\"latex\":\"N_{cL}=\\\\left[\\\\frac{N_{umL}\\\\left(0\\\\right)}{0!},\\\\frac{N_{umL}'\\\\left(0\\\\right)}{1!},\\\\frac{N_{umL}''\\\\left(0\\\\right)}{2!},\\\\frac{N_{umL}'''\\\\left(0\\\\right)}{3!},\\\\frac{N_{umL}'''\\\\left(0\\\\right)}{4!}\\\\right]\"},{\"type\":\"expression\",\"id\":\"2061\",\"folderId\":\"2058\",\"color\":\"#6042a6\",\"latex\":\"N_{realL}(x)=N_{cL}[1]-N_{cL}[3]\\\\cdot x^{2}+N_{cL}[5]\\\\cdot x^{4}\",\"hidden\":true},{\"type\":\"expression\",\"id\":\"2062\",\"folderId\":\"2058\",\"color\":\"#6042a6\",\"latex\":\"N_{imL}(x)=N_{cL}[2]\\\\cdot x-N_{cL}[4]\\\\cdot x^{3}\",\"hidden\":true},{\"type\":\"expression\",\"id\":\"2063\",\"folderId\":\"2058\",\"color\":\"#2d70b3\",\"latex\":\"G_{dBL}\\\\left(x\\\\right)=20\\\\log\\\\left(\\\\frac{\\\\sqrt{N_{realL}\\\\left(f\\\\right)^{2}+N_{imL}\\\\left(f\\\\right)^{2}}}{\\\\sqrt{D_{real}\\\\left(f\\\\right)^{2}+D_{im}\\\\left(f\\\\right)^{2}}}\\\\right)\\\\left\\\\{O_{2}=1\\\\right\\\\}\",\"hidden\":true},{\"type\":\"expression\",\"id\":\"2144\",\"folderId\":\"2058\",\"color\":\"#2d70b3\",\"latex\":\"G_{dBLF}\\\\left(x\\\\right)=\\\\frac{180}{\\\\pi}\\\\left(\\\\arctan\\\\left(N_{imL}\\\\left(f\\\\right),N_{realL}\\\\left(f\\\\right)\\\\right)-\\\\arctan\\\\left(D_{im}\\\\left(f\\\\right),D_{real}\\\\left(f\\\\right)\\\\right)\\\\left\\\\{O_{2}=1\\\\right\\\\}\\\\right)\"},{\"type\":\"folder\",\"id\":\"23\",\"title\":\"Cursor R\",\"collapsed\":true},{\"type\":\"text\",\"id\":\"2066\",\"folderId\":\"23\",\"text\":\"Cursor R\"},{\"type\":\"expression\",\"id\":\"19\",\"folderId\":\"23\",\"color\":\"#c74440\",\"latex\":\"a=159.15494309189532\",\"hidden\":true,\"slider\":{\"max\":\"2200000\"}},{\"type\":\"expression\",\"id\":\"26\",\"folderId\":\"23\",\"color\":\"#2d70b3\",\"latex\":\"V_{2}=\\\\operatorname{round}\\\\left(G_{dBF}\\\\left(a\\\\right),3\\\\right)\"},{\"type\":\"expression\",\"id\":\"21\",\"folderId\":\"23\",\"color\":\"#000000\",\"latex\":\"y=G_{dBF}\\\\left(a\\\\right)\",\"lineStyle\":\"DASHED\",\"lineWidth\":\"1\"},{\"type\":\"expression\",\"id\":\"20\",\"folderId\":\"23\",\"color\":\"#000000\",\"latex\":\"x=a\\\\left\\\\{O=1\\\\right\\\\}\",\"lineStyle\":\"DASHED\",\"lineWidth\":\"1\"},{\"type\":\"expression\",\"id\":\"18\",\"folderId\":\"23\",\"color\":\"#000000\",\"latex\":\"\\\\left(a,G_{dBF}\\\\left(a\\\\right)\\\\right)\",\"showLabel\":true,\"label\":\"(${a} Hz, ${V_2} º)\",\"pointStyle\":\"OPEN\",\"labelOrientation\":\"below\"},{\"type\":\"folder\",\"id\":\"2102\",\"title\":\"Cursor C\",\"collapsed\":true},{\"type\":\"expression\",\"id\":\"2110\",\"folderId\":\"2102\",\"color\":\"#6042a6\",\"latex\":\"a_{c}=0.16\",\"slider\":{\"max\":\"2800000\"}},{\"type\":\"expression\",\"id\":\"2111\",\"folderId\":\"2102\",\"color\":\"#c74440\",\"latex\":\"y=G_{dBCF}\\\\left(a_{c}\\\\right)\",\"lineStyle\":\"DASHED\",\"lineWidth\":\"1\"},{\"type\":\"expression\",\"id\":\"2112\",\"folderId\":\"2102\",\"color\":\"#388c46\",\"latex\":\"V_{c}=\\\\operatorname{round}\\\\left(G_{dBCF}\\\\left(a_{c}\\\\right),3\\\\right)\"},{\"type\":\"expression\",\"id\":\"2113\",\"folderId\":\"2102\",\"color\":\"#c74440\",\"latex\":\"x=a_{c}\\\\left\\\\{O_{1}=1\\\\right\\\\}\",\"lineStyle\":\"DASHED\",\"lineWidth\":\"1\"},{\"type\":\"expression\",\"id\":\"2114\",\"folderId\":\"2102\",\"color\":\"#c74440\",\"latex\":\"\\\\left(a_{c},G_{dBCF}\\\\left(a_{c}\\\\right)\\\\right)\",\"showLabel\":true,\"label\":\"(${a_c} Hz, ${V_c} º)\",\"pointStyle\":\"OPEN\"},{\"type\":\"folder\",\"id\":\"2083\",\"title\":\"Cursor L\",\"collapsed\":true},{\"type\":\"expression\",\"id\":\"2097\",\"folderId\":\"2083\",\"color\":\"#000000\",\"latex\":\"a_{L}=159154.94\",\"slider\":{\"max\":\"67375660\"}},{\"type\":\"expression\",\"id\":\"2098\",\"folderId\":\"2083\",\"color\":\"#2d70b3\",\"latex\":\"y=G_{dBLF}\\\\left(a_{L}\\\\right)\",\"lineStyle\":\"DASHED\",\"lineWidth\":\"1\"},{\"type\":\"expression\",\"id\":\"2099\",\"folderId\":\"2083\",\"color\":\"#2d70b3\",\"latex\":\"x=a_{L}\\\\left\\\\{O_{2}=1\\\\right\\\\}\",\"lineStyle\":\"DASHED\",\"lineWidth\":\"1\"},{\"type\":\"expression\",\"id\":\"2100\",\"folderId\":\"2083\",\"color\":\"#388c46\",\"latex\":\"V_{L}=\\\\operatorname{round}\\\\left(G_{dBLF}\\\\left(a_{L}\\\\right),3\\\\right)\"},{\"type\":\"expression\",\"id\":\"2101\",\"folderId\":\"2083\",\"color\":\"#2d70b3\",\"latex\":\"\\\\left(a_{L},G_{dBLF}\\\\left(a_{L}\\\\right)\\\\right)\",\"showLabel\":true,\"label\":\"(${a_L} Hz, ${V_L} º)\",\"pointStyle\":\"OPEN\"},{\"type\":\"folder\",\"id\":\"2200\",\"title\":\"Cursor RL\",\"collapsed\":true},{\"type\":\"text\",\"id\":\"2201\",\"folderId\":\"2200\",\"text\":\"Cursor RL\"},{\"type\":\"expression\",\"id\":\"2202\",\"folderId\":\"2200\",\"color\":\"#c74440\",\"latex\":\"a_{RL}=15915.49\",\"hidden\":true,\"slider\":{\"max\":\"2200000\"}},{\"type\":\"expression\",\"id\":\"2203\",\"folderId\":\"2200\",\"color\":\"#2d70b3\",\"latex\":\"V_{RL}=\\\\operatorname{round}\\\\left(G_{dBRLF}\\\\left(a_{RL}\\\\right),3\\\\right)\"},{\"type\":\"expression\",\"id\":\"2204\",\"folderId\":\"2200\",\"color\":\"#388c46\",\"latex\":\"y=G_{dBRLF}\\\\left(a_{RL}\\\\right)\",\"lineStyle\":\"DASHED\",\"lineWidth\":\"1\"},{\"type\":\"expression\",\"id\":\"2205\",\"folderId\":\"2200\",\"color\":\"#388c46\",\"latex\":\"x=a_{RL}\\\\left\\\\{O_{5}=1\\\\right\\\\}\",\"lineStyle\":\"DASHED\",\"lineWidth\":\"1\"},{\"type\":\"expression\",\"id\":\"2206\",\"folderId\":\"2200\",\"color\":\"#388c46\",\"latex\":\"\\\\left(a_{RL},G_{dBRLF}\\\\left(a_{RL}\\\\right)\\\\right)\",\"showLabel\":true,\"label\":\"(${a_RL} Hz, ${V_RL} º)\",\"pointStyle\":\"OPEN\",\"labelOrientation\":\"below\"},{\"type\":\"folder\",\"id\":\"2207\",\"title\":\"Cursor RC\",\"collapsed\":true},{\"type\":\"text\",\"id\":\"2208\",\"folderId\":\"2207\",\"text\":\"Cursor RC\"},{\"type\":\"expression\",\"id\":\"2209\",\"folderId\":\"2207\",\"color\":\"#c74440\",\"latex\":\"a_{RC}=1.59\",\"hidden\":true,\"slider\":{\"max\":\"15000000\"}},{\"type\":\"expression\",\"id\":\"2210\",\"folderId\":\"2207\",\"color\":\"#2d70b3\",\"latex\":\"V_{RC}=\\\\operatorname{round}\\\\left(G_{dBRCF}\\\\left(a_{RC}\\\\right),3\\\\right)\"},{\"type\":\"expression\",\"id\":\"2211\",\"folderId\":\"2207\",\"color\":\"#6042a6\",\"latex\":\"y=G_{dBRCF}\\\\left(a_{RC}\\\\right)\",\"lineStyle\":\"DASHED\",\"lineWidth\":\"1\"},{\"type\":\"expression\",\"id\":\"2212\",\"folderId\":\"2207\",\"color\":\"#6042a6\",\"latex\":\"x=a_{RC}\\\\left\\\\{O_{4}=1\\\\right\\\\}\",\"lineStyle\":\"DASHED\",\"lineWidth\":\"1\"},{\"type\":\"expression\",\"id\":\"2213\",\"folderId\":\"2207\",\"color\":\"#6042a6\",\"latex\":\"\\\\left(a_{RC},G_{dBRCF}\\\\left(a_{RC}\\\\right)\\\\right)\",\"showLabel\":true,\"label\":\"(${a_RC} Hz, ${V_RC} º)\",\"pointStyle\":\"OPEN\",\"labelOrientation\":\"below\"},{\"type\":\"folder\",\"id\":\"2214\",\"title\":\"Cursor LC\",\"collapsed\":true},{\"type\":\"text\",\"id\":\"2215\",\"folderId\":\"2214\",\"text\":\"Cursor LC\"},{\"type\":\"expression\",\"id\":\"2216\",\"folderId\":\"2214\",\"color\":\"#c74440\",\"latex\":\"a_{LC}=159.15494309189532\",\"hidden\":true,\"slider\":{\"max\":\"2200000\"}},{\"type\":\"expression\",\"id\":\"2217\",\"folderId\":\"2214\",\"color\":\"#2d70b3\",\"latex\":\"V_{LC}=\\\\operatorname{round}\\\\left(G_{dBLCF}\\\\left(a_{LC}\\\\right),3\\\\right)\"},{\"type\":\"expression\",\"id\":\"2218\",\"folderId\":\"2214\",\"color\":\"#fa7e19\",\"latex\":\"y=G_{dBLCF}\\\\left(a_{LC}\\\\right)\",\"lineStyle\":\"DASHED\",\"lineWidth\":\"1\"},{\"type\":\"expression\",\"id\":\"2219\",\"folderId\":\"2214\",\"color\":\"#fa7e19\",\"latex\":\"x=a_{LC}\\\\left\\\\{O_{3}=1\\\\right\\\\}\",\"lineStyle\":\"DASHED\",\"lineWidth\":\"1\"},{\"type\":\"expression\",\"id\":\"2220\",\"folderId\":\"2214\",\"color\":\"#fa7e19\",\"latex\":\"\\\\left(a_{LC},G_{dBLCF}\\\\left(a_{LC}\\\\right)\\\\right)\",\"showLabel\":true,\"label\":\"(${a_LC} Hz, ${V_LC} 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