Sr Examen
Simplificación de expresiones/
Descomposición en fracciones simples/
150/(1+150*((15*150)/(151*(1/10p+1))+(15/(260*(5p^2+p)))))
¿Cómo vas a descomponer esta 150/(1+150*((15*150)/(151*(1/10p+1))+(15/(260*(5p^2+p))))) expresión en fracciones?
Solución
Ha introducido
[src]
150
---------------------------------------
/ 2250 15 \
1 + 150*|------------ + --------------|
| /p \ / 2 \|
|151*|-- + 1| 260*\5*p + p/|
\ \10 / /
$$\frac{150}{150 \left(\frac{15}{260 \left(5 p^{2} + p\right)} + \frac{2250}{151 \left(\frac{p}{10} + 1\right)}\right) + 1}$$
150/(1 + 150*(2250/((151*(p/10 + 1))) + 15/((260*(5*p^2 + p)))))
Descomposición de una fracción
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150 - 33750*(1510 + 390151*p + 1950000*p^2)/(339750 + 19630*p^3 + 87823235*p + 438950226*p^2)
$$- \frac{33750 \left(1950000 p^{2} + 390151 p + 1510\right)}{19630 p^{3} + 438950226 p^{2} + 87823235 p + 339750} + 150$$
/ 2\
33750*\1510 + 390151*p + 1950000*p /
150 - ---------------------------------------------
3 2
339750 + 19630*p + 87823235*p + 438950226*p
Simplificación general
[src]
/ 2 \
588900*p*\10 + 5*p + 51*p/
---------------------------------------------
3 2
339750 + 19630*p + 87823235*p + 438950226*p
$$\frac{588900 p \left(5 p^{2} + 51 p + 10\right)}{19630 p^{3} + 438950226 p^{2} + 87823235 p + 339750}$$
588900*p*(10 + 5*p^2 + 51*p)/(339750 + 19630*p^3 + 87823235*p + 438950226*p^2)
Unión de expresiones racionales
[src]
588900*p*(1 + 5*p)*(10 + p) ------------------------------------------------------------------- 339750 + 33975*p + 87750000*p*(1 + 5*p) + 3926*p*(1 + 5*p)*(10 + p)
$$\frac{588900 p \left(p + 10\right) \left(5 p + 1\right)}{3926 p \left(p + 10\right) \left(5 p + 1\right) + 87750000 p \left(5 p + 1\right) + 33975 p + 339750}$$
588900*p*(1 + 5*p)*(10 + p)/(339750 + 33975*p + 87750000*p*(1 + 5*p) + 3926*p*(1 + 5*p)*(10 + p))
Respuesta numérica
[src]
150.0/(1.0 + 2250.0/(260.0*p + 1300.0*p^2) + 337500.0/(151.0 + 15.1*p))
150.0/(1.0 + 2250.0/(260.0*p + 1300.0*p^2) + 337500.0/(151.0 + 15.1*p))
Denominador común
[src]
2
50962500 + 13167596250*p + 65812500000*p
150 - ---------------------------------------------
3 2
339750 + 19630*p + 87823235*p + 438950226*p
$$- \frac{65812500000 p^{2} + 13167596250 p + 50962500}{19630 p^{3} + 438950226 p^{2} + 87823235 p + 339750} + 150$$
150 - (50962500 + 13167596250*p + 65812500000*p^2)/(339750 + 19630*p^3 + 87823235*p + 438950226*p^2)
Compilar la expresión
[src]
150
---------------------------------
2250 337500
1 + --------------- + -----------
2 151*p
260*p + 1300*p 151 + -----
10
$$\frac{150}{1 + \frac{2250}{1300 p^{2} + 260 p} + \frac{337500}{\frac{151 p}{10} + 151}}$$
150/(1 + 2250/(260*p + 1300*p^2) + 337500/(151 + 151*p/10))
Parte trigonométrica
[src]
150
---------------------------------
2250 337500
1 + --------------- + -----------
2 151*p
260*p + 1300*p 151 + -----
10
$$\frac{150}{1 + \frac{2250}{1300 p^{2} + 260 p} + \frac{337500}{\frac{151 p}{10} + 151}}$$
150/(1 + 2250/(260*p + 1300*p^2) + 337500/(151 + 151*p/10))
Combinatoria
[src]
588900*p*(1 + 5*p)*(10 + p)
---------------------------------------------
3 2
339750 + 19630*p + 87823235*p + 438950226*p
$$\frac{588900 p \left(p + 10\right) \left(5 p + 1\right)}{19630 p^{3} + 438950226 p^{2} + 87823235 p + 339750}$$
588900*p*(1 + 5*p)*(10 + p)/(339750 + 19630*p^3 + 87823235*p + 438950226*p^2)
Denominador racional
[src]
/ 2 \
588900*p*\10 + 5*p + 51*p/
---------------------------------------------
3 2
339750 + 19630*p + 87823235*p + 438950226*p
$$\frac{588900 p \left(5 p^{2} + 51 p + 10\right)}{19630 p^{3} + 438950226 p^{2} + 87823235 p + 339750}$$
588900*p*(10 + 5*p^2 + 51*p)/(339750 + 19630*p^3 + 87823235*p + 438950226*p^2)
Potencias
[src]
150
---------------------------------
2250 337500
1 + --------------- + -----------
2 151*p
260*p + 1300*p 151 + -----
10
$$\frac{150}{1 + \frac{2250}{1300 p^{2} + 260 p} + \frac{337500}{\frac{151 p}{10} + 151}}$$
150/(1 + 2250/(260*p + 1300*p^2) + 337500/(151 + 151*p/10))