tahanikhodr19 tahanikhodr19

20-07-2022
Mathematics

contestada

10yy'=x y(10)=4
Find the solution of the differential equation that satisfies the given initial condition.

Respuesta :

surjithayer surjithayer

20-07-2022

Answer:

Step-by-step explanation:

10yy'=x

[tex]10y\frac{dy}{dx} =x\\separating~the~variables\\10 ydy=xdx\\integrating\\\int 10ydy=\int xdx+c\\\frac{10y^2}{2} =\frac{x^2}{2} +c\\10y^2=x^2+2c\\when~x=10\\y=4\\10(4)^2=10^2+2c\\160=100+2c\\2c=160-100=60\\c=\frac{60}{2} =30\\10y^2=x^2+60\\10y^2-x^2=60[/tex]

Answer Link

Otras preguntas

Suppose a=b what is the value of sin (

Which founding father work to establish a separation between church and government by drafting the Virginia bill of establishing religious freedom

after mislabeling a product that has been packaged and distributed what should a company do to correct this problem

find the pattern 45,90,180,360

9.1= k divided by 3.7+4.1

In “initiation” on example of a character vs. self conflict is when Millicent

What is the energy equivalent of an object with a mass of 1.05 g? 3.15 × 105 J 3.15 × 108 J 9.45 × 1013 J 9.45 × 1016 J

Justify each step in solving the equation 6x = 3(x + 4) by writing a reason for each statement. Drag the answers into the boxes to correctly complete the proo

(x+y)/(x-y)÷(x^2-y^2)/(x^2+1)

20 POINTS HELP ME !!!!! Graph the following lines and write the equation in slope-intercept form. Through the points (4,2) and (3,1).