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Equação:
Equação (x-4)^2+(x+9)^2=2*x^2
Equação sin(x)=-1/4
Equação tg(x)=-1/2
Equação sqrt(x-2sqrt(x-1))+sqrt(x+2sqrt(x-1))=x-1
Express {x} in terms of y where:
14*x-16*y=14
-10*x+18*y=6
4*x+13*y=13
17*x-19*y=1
Derivative of:
2*x^2
Integral d{x}:
2*x^2
Graphing y =:
2*x^2
Identical expressions
(x- four)^ two +(x+ nine)^ two = two *x^ two
(x minus 4) squared plus (x plus 9) squared equally 2 multiply by x squared
(x minus four) to the power of two plus (x plus nine) to the power of two equally two multiply by x to the power of two
(x-4)2+(x+9)2=2*x2
x-42+x+92=2*x2
(x-4)²+(x+9)²=2*x²
(x-4) to the power of 2+(x+9) to the power of 2=2*x to the power of 2
(x-4)^2+(x+9)^2=2x^2
(x-4)2+(x+9)2=2x2
x-42+x+92=2x2
x-4^2+x+9^2=2x^2
Similar expressions
-3x^2-5x-6=-x^2-x+(-1-2x^2)
lg^2(x^2)+lg(10*x)-6=0
(x-4)^2+(x-9)^2=2*x^2
(x-2)^2+(x-3)^2=2x^2
sqrt(5x^2-20x+21)+sqrt(3x^2-12x+28)=8x-2x^2-3
(x+4)^2+(x+9)^2=2*x^2
2x^2-5x-7=0
(x-4)^2-(x+9)^2=2*x^2

(x-4)^2+(x+9)^2=2*x^2 equação

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You have entered [src]

       2          2      2
(x - 4)  + (x + 9)  = 2*x

$$\left(x - 4\right)^{2} + \left(x + 9\right)^{2} = 2 x^{2}$$

Simplify

Detail solution

Given the equation:

(x-4)^2+(x+9)^2 = 2*x^2

Expand expressions:

16 + x^2 - 8*x + (x + 9)^2 = 2*x^2

16 + x^2 - 8*x + 81 + x^2 + 18*x = 2*x^2

Reducing, you get:

97 + 10*x = 0

Move free summands (without x)
from left part to right part, we given:
$$10 x = -97$$
Divide both parts of the equation by 10

x = -97 / (10)

We get the answer: x = -97/10

The graph

Plot the graph f1(x)

Plot the graph f2(x)

Rapid solution [src]

     -97 
x1 = ----
      10

$$x_{1} = - \frac{97}{10}$$

x1 = -97/10

Sum and product of roots [src]

sum

-97 
----
 10

$$- \frac{97}{10}$$

-97 
----
 10

$$- \frac{97}{10}$$

product

-97 
----
 10

$$- \frac{97}{10}$$

-97 
----
 10

$$- \frac{97}{10}$$

-97/10

Numerical answer [src]

x1 = -9.7

x1 = -9.7

Gráfico