Aggiorna a pro
Vai al sito
We've updated our
Privacy Policy
effective December 15. Please read our updated Privacy Policy and tap
Continue
Soluzioni
Calcolatore integrale
Calcolatore di derivate
Calcolatore di algebra
Calcolatore della matrice
Di più...
Grafico
Grafico lineare
Grafico esponenziale
Grafico quadratico
Grafico sinusoidale
Di più...
Calcolatrici
Calcolatore dell'IMC
Calcolatore dell'interesse composto
Calcolatore percentuale
Calcolatore dell'accelerazione
Di più...
Geometria
Calcolatore del teorema di Pitagora
Calcolatore dell'area del cerchio
Calcolatore del triangolo isoscele
Calcolatore dei triangoli
Di più...
Utensili
Notebook
Gruppi
Trucchetti
Fogli di lavoro
Guide allo studio
Pratica
Verifica soluzione
it
English
Español
Português
Français
Deutsch
Italiano
Русский
中文(简体)
한국어
日本語
Tiếng Việt
עברית
العربية
Aggiornamento
Problemi popolari
Argomenti
Pre algebra
Algebra
Problemi di parole
Functions & Graphing
Geometria
Trigonometria
Pre Calculus
Calcoli
Dati statistici
Popolari Calcoli Problemi
maclaurin ((2+x))/(1-x)
maclaurin
(
2
+
x
)
1
−
x
integral of (x^2)/((x-4)(x-5)^2)
∫
x
2
(
x
−
4
)
(
x
−
5
)
2
dx
derivative of ln(1-sin(x))
d
dx
(
ln
(
1
−
sin
(
x
)
)
)
derivative of (2x^{-2}+3^{-3})
d
dx
(
(
2
x
−
2
+
3
)
−
3
)
y^{''}+9y=cos(5t)
y
′
′
+
9
y
=
cos
(
5
t
)
tangent y=2x^2+3x,(-2,2)
tangent
y
=
2
x
2
+
3
x
,
(
−
2
,
2
)
integral of ((sin(3x)-cos(2x)))/4
∫
(
sin
(
3
x
)
−
cos
(
2
x
)
)
4
dx
limit as x approaches-3 of (x^2-4)/(x-2)
lim
x
→
−
3
(
x
2
−
4
x
−
2
)
derivative x*2^x
derivative
x
·
2
x
tangent e^{-8x}
tangent
e
−
8
x
y^'=-(4x)/y ,y(2)=3
y
′
=
−
4
x
y
,
y
(
2
)
=
3
limit as x approaches-4 of-2
lim
x
→
−
4
(
−
2
)
integral of 6x^5e^{x^6}
∫
6
x
5
e
x
6
dx
derivative of sqrt(x^3+8x)
d
dx
(
√
x
3
+
8
x
)
derivative f(x)=e^{2y}(1-y)
derivative
f
(
x
)
=
e
2
y
(
1
−
y
)
derivative of (10^x+10^{-x}^2)
d
dx
(
(
1
0
x
+
1
0
−
x
)
2
)
limit as x approaches 2 of (4x)/(x-2)
lim
x
→
2
(
4
x
x
−
2
)
tangent x^2-8x+9
tangent
x
2
−
8
x
+
9
area x^2-2x+2,(0,1)
area
x
2
−
2
x
+
2
,
(
0
,
1
)
integral of (2y+3)^2
∫
(
2
y
+
3
)
2
dy
d/(dt)(e^{-3t})
d
dt
(
e
−
3
t
)
limit as x approaches infinity of 3x+1/2
lim
x
→
∞
(
3
x
+
1
2
)
integral of 2/(x^2-2x)
∫
2
x
2
−
2
x
dx
derivative of x/(log_{10(x)})
d
dx
(
x
log
1
0
(
x
)
)
derivative y= 1/(log_{4)(x)}
derivative
y
=
1
log
4
(
x
)
integral from 0 to 4 of 2/(x^2)
∫
0
4
2
x
2
dx
integral from-1 to 1 of 2x^2
∫
−
1
1
2
x
2
dx
derivative of (-20/((2+x)^2))
d
dx
(
−
2
0
(
2
+
x
)
2
)
area x^2-11,10x
area
x
2
−
1
1
,
1
0
x
limit as (x,y) approaches (0,0) of (e^{xy}-1)/(xy)
lim
(
x
,
y
)
→
(
0
,
0
)
(
e
xy
−
1
xy
)
(\partial)/(\partial x)(x^4+3y^3)
∂
∂
x
(
x
4
+
3
y
3
)
limit as x approaches 1 of x^3-3x+2
lim
x
→
1
(
x
3
−
3
x
+
2
)
integral of 1/(x+x^2)
∫
1
x
+
x
2
dx
y^{''}+1/2 y=0
y
′
′
+
1
2
y
=
0
derivative f(x)=(5sqrt(x)+9)x^2
derivative
f
(
x
)
=
(
5
√
x
+
9
)
x
2
tangent 3/(sqrt(x)),\at x= 1/16
tangent
3
√
x
,
at
x
=
1
1
6
(dy)/(dt)=ycos(3t+2)
dy
dt
=
y
cos
(
3
t
+
2
)
area x,0,0.5
area
x
,
0
,
0
.
5
integral of e^bsin(t-b)
∫
e
b
sin
(
t
−
b
)
db
integral from x to sqrt(x of)1
∫
x
√
x
1
dt
integral from 0 to 1 of (62)/(4y-1)
∫
0
1
6
2
4
y
−
1
dy
derivative of x/(1+ln(x))
d
dx
(
x
1
+
ln
(
x
)
)
derivative y=(3x)/(sin(x))
derivative
y
=
3
x
sin
(
x
)
limit as x approaches-1 of sqrt(6-3x)
lim
x
→
−
1
(
√
6
−
3
x
)
(\partial)/(\partial x)(y)
∂
∂
x
(
y
)
integral from 0 to 2 of [(-x^2+4x)-x^2]
∫
0
2
[
(
−
x
2
+
4
x
)
−
x
2
]
dx
derivative of 1-9/(x^2)
d
dx
(
1
−
9
x
2
)
limit as x approaches-2 of (x+4)/(x+2)
lim
x
→
−
2
(
x
+
4
x
+
2
)
derivative of (-16x^2+1^2)
d
dx
(
(
−
1
6
x
2
+
1
)
2
)
integral from 2 to 5 of 5/(x^2-1)
∫
2
5
5
x
2
−
1
dx
limit as x approaches 5-of (x^5)/((x-5))
lim
x
→
5
−
(
x
5
(
x
−
5
)
)
derivative (2x^2+8x+2)/(sqrt(x))
derivative
2
x
2
+
8
x
+
2
√
x
integral of (cos(x)-tan(x))/(cos^2(x))
∫
cos
(
x
)
−
tan
(
x
)
cos
2
(
x
)
dx
derivative sqrt(4x)
derivative
√
4
x
derivative of sin(x+4x^2)
d
dx
(
sin
(
x
)
+
4
x
2
)
sum from n=2 to infinity of 1/(2ie^nn^2)
∑
n
=
2
∞
1
2
ie
n
n
2
integral of 1/(e^{a*x)}
∫
1
e
a
·
x
dx
derivative f(x)=\sqrt[3]{x^2}+sqrt(x)
derivative
f
(
x
)
=
3
√
x
2
+
√
x
integral of (csc(x)+tan(x))^2
∫
(
csc
(
x
)
+
tan
(
x
)
)
2
dx
xy^'=y+2x^2y
xy
′
=
y
+
2
x
2
y
derivative of (1+5x^2(x-x^2))
d
dx
(
(
1
+
5
x
2
)
(
x
−
x
2
)
)
limit as x approaches 0 of 2/(x^2(x+7))
lim
x
→
0
(
2
x
2
(
x
+
7
)
)
derivative of e^x*sin(2x)
d
dx
(
e
x
·
sin
(
2
x
)
)
derivative of sqrt(8x-x^2)
d
dx
(
√
8
x
−
x
2
)
integral of 6cos(6x)-5
∫
6
cos
(
6
x
)
−
5
dx
(\partial)/(\partial x)(x-1)
∂
∂
x
(
x
−
1
)
maclaurin 7/(1+x)
maclaurin
7
1
+
x
(\partial)/(\partial x)(3x^2y-1)
∂
∂
x
(
3
x
2
y
−
1
)
integral of (6x+2)/(x^2+9)
∫
6
x
+
2
x
2
+
9
dx
derivative of (x+3/(x+2))
d
dx
(
x
+
3
x
+
2
)
derivative of 4/(4-10x)
d
dx
(
4
4
−
1
0
x
)
derivative of (x^2-2/x)
d
dx
(
x
2
−
2
x
)
tangent x^2+2xy-y^2+x=5,(3,7)
tangent
x
2
+
2
xy
−
y
2
+
x
=
5
,
(
3
,
7
)
d/(dt)(tln(t))
d
dt
(
t
ln
(
t
)
)
limit as x approaches 0+of x/(ln(x))
lim
x
→
0
+
(
x
ln
(
x
)
)
area f(x)=x^2+4x-5,-3,3
area
f
(
x
)
=
x
2
+
4
x
−
5
,
−
3
,
3
limit as x approaches 3 of (5x)/(x-3)
lim
x
→
3
(
5
x
x
−
3
)
derivative of ln((3x/(2x+1)))
d
dx
(
ln
(
3
x
2
x
+
1
)
)
integral of 1/((x+2)(x+7)(2x-5)(x+1)^2)
∫
1
(
x
+
2
)
(
x
+
7
)
(
2
x
−
5
)
(
x
+
1
)
2
dx
area y=xe^{-0.4x},x=5,y=0
area
y
=
xe
−
0
.
4
x
,
x
=
5
,
y
=
0
derivative of 2+sin(x)
d
dx
(
2
+
sin
(
x
)
)
limit as x approaches 5+of (x-5)/(x-5)
lim
x
→
5
+
(
x
−
5
x
−
5
)
limit as x approaches 0 of sqrt(x)ln(x)
lim
x
→
0
(
√
x
ln
(
x
)
)
xy^'-y=2x^2-x-2
xy
′
−
y
=
2
x
2
−
x
−
2
integral of (cos(x)+1)^2-(sin(x)+1)^2
∫
(
cos
(
x
)
+
1
)
2
−
(
sin
(
x
)
+
1
)
2
dx
-2((dy)/(dx))+6x^2=0
−
2
(
dy
dx
)
+
6
x
2
=
0
y^{''}+25y=-40sec(5t)
y
′
′
+
2
5
y
=
−
4
0
sec
(
5
t
)
integral of 1/(a^2-x^2)
∫
1
a
2
−
x
2
dx
limit as x approaches 2 of (x^2)^2
lim
x
→
2
(
(
x
2
)
2
)
area y=x,y=3x,y=-x+2
area
y
=
x
,
y
=
3
x
,
y
=
−
x
+
2
sum from n=0 to infinity of n*(3/4)^n
∑
n
=
0
∞
n
·
(
3
4
)
n
integral of ((x+1))/(x^3+x^2+6x)
∫
(
x
+
1
)
x
3
+
x
2
+
6
x
dx
x^'=4x-x^3
x
′
=
4
x
−
x
3
derivative of (sqrt(x)-5/(sqrt(x)+6))
d
dx
(
√
x
−
5
√
x
+
6
)
derivative of bx
d
dx
(
bx
)
y^'=t+3
y
′
=
t
+
3
(\partial)/(\partial x)(((3x+5))/(6y+1))
∂
∂
x
(
(
3
x
+
5
)
6
y
+
1
)
integral from 0 to 2 of pi(4x^2-x^4)
∫
0
2
π
(
4
x
2
−
x
4
)
dx
tangent y=cos(x),\at x= pi/4
tangent
y
=
cos
(
x
)
,
at
x
=
π
4
y^{''}+y^'-y=0
y
′
′
+
y
′
−
y
=
0
1
..
1055
1056
1057
1058
1059
..
2459