Procedimientos y medicamentos antidepresivos
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Jul 22, 2024
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About This Presentation
Explicación de procedimientos y antidepresivos
Slide Content
Procedimientos Médicos
Integrantes del grupo Alejandra Nicole Laínez Alex Daniel Villamil Eduardo Antonio Toledo Elena Marcela López
01. Punción Lumbar Start by identifying the polynomial function you want to find the antiderivative for. A simple polynomial is a mathematical expression consisting of a sum of terms , each containing a constant coefficient and a variable raised to a non-negative integer power
Caracteristicas de la punción Lumbar Aspecto Volumen Velocidad Presión Claro e incoloro 150 ml 0.5 ml/min 60 – 150 mmH2O Proteínas Glucosa Células Cloro 15-45 mg/dl 50 – 85 mg/dl 0 – 3 linfocitos/mm3 120 – 130 mEq/ml
Materiales para una punción lumbar Aguja raquídea numero 20 Equipo de venoclisis Jesinga de 10 ml Xylocaína o Lidocaína Frasquitos para muestra
02. Toracocentesis Start by identifying the polynomial function you want to find the antiderivative for. A simple polynomial is a mathematical expression consisting of a sum of terms , each containing a constant coefficient and a variable raised to a non-negative integer power
03. Paracentesis Start by identifying the polynomial function you want to find the antiderivative for. A simple polynomial is a mathematical expression consisting of a sum of terms , each containing a constant coefficient and a variable raised to a non-negative integer power
04. Acceso Intraóseo Start by identifying the polynomial function you want to find the antiderivative for. A simple polynomial is a mathematical expression consisting of a sum of terms , each containing a constant coefficient and a variable raised to a non-negative integer power
Antidepresivos
To find the antiderivative of each term in the polynomial, apply the power rule for antiderivatives . The power rule states that if you have a term of the form x n , where n is a constant, the antiderivative is (1/(n+1)) * x (n+1) + C , where C is the constant of integration Example For the term 2x 3 , the antiderivative is (1/4) * x 4 + C For the term 5x 2 , the antiderivative is (1/3) * x 3 + C
3. Combine antiderivatives If your polynomial consists of multiple terms , apply the power rule to each term individually and then combine the antiderivatives 3x 2 + 2x + 7 Find the antiderivative of each term separately Antiderivative of 3x 2 is (1/3) * x 3 + C Antiderivative of 2x is x 2 + C Antiderivative of 7 is 7x + C Combine the antiderivatives to get the final antiderivative: (1/3) * x 3 + x 2 + 7x + C
04. Include the constant of integration Constant of integration Example The antiderivative In each antiderivative, always include the constant of integration , denoted as C . This constant accounts for the fact that there may be multiple antiderivatives that differ by a constant value The antiderivative of 3x 2 is (1/3) * x 3 + C , where C can be any constant By following these steps, you can find the antiderivative of simple polynomial functions. Antiderivatives play a crucial role in calculus , as they allow you to find the original function when you know its rate of change (derivative)
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