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Chase2001

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About Chase2001

  • Birthday 12/10/2001

Profile Information

  • Location
    England
  • Interests
    Math
    Science
    Astonomy
    League of Legends
  • Favorite Area of Science
    Math!
  • Biography
    My name is Chase. I'm 12 years old and I love math
  • Occupation
    Pocket money :P

Chase2001's Achievements

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  1. Solve the following system of linear equations. a) [latex]2x-y+z=1[/latex] b) [latex]4x+y+z=2[/latex] c) [latex]x-y-2z=0[/latex] The y's cancel in equations a and b to give e) [latex]6x+2z=3[/latex] The y's cancel in equations b and c to give f) [latex]5x-z=3[/latex] I now multiply f by 2 and add it to equation e to eliminate z giving me [latex]16x=7 \Rightarrow x=\frac{7}{16}[/latex] Now I plug [latex]\frac{7}{16}[/latex] back into equation f giving me [latex]5\left(\frac{7}{16}\right)-z=2 \Rightarrow \frac{35}{16}-2=z \Rightarrow z=\frac{3}{16}[/latex] Then finally I plug x and z back into equation b giving me [latex]4\left(\frac{7}{16}\right)+\frac{3}{16}+z=2 \Rightarrow \frac{35}{16}+\frac{3}{16}+z=2 \Rightarrow \frac{31}{16}-2=-z \Rightarrow z=\frac{1}{16}[/latex] I find it difficult to keep track of these long winded questions so I took the time to learn latex so it should be easier for you guys to read and in turn easier to help me if need be. Just out of curiosity what are linear equations used for in the real world? I would quite like to be a physicist or a structural engineer when I grow up
  2. Thanks this makes it a bit clearer. Much faster than my method. Direct substituation works for all linear equations right?
  3. Oh yeh I see my error but the approach is ok which is what I wanted to know. It just gets a bit confusing because I end up with so many equations on my page lol
  4. Hello everyone. My name is Chase and I'm here to get some help with my math. I have the following problem. Solve the following system of linear equations: 1) 2x-3y+z=0 2) x+y+z=1 3) x-2y-4z=2 From what I have learnt in my book. I can take two of the equations and get rid of a variable, then I need to take two more equations and get rid of the same variable. This is what I have so far. I take equation 1 and 3 and multiply the first by 4 1) 8x-12y+4z=0 3) x-2y-4z=8 This gives me 9x+14y=9 Now I take equations 2 and 3 and multiply equation 2 by 4. 2) 4x+4y+4z=4 3) x-2y-4z=2 This gives me 5x+2y=6. Now if I understand I now need to take these 2 new equations and solve for x or y? I guess i'll multiply the second equation by 7 to get rid of the y. Then i'll change the signs to make the subtraction 9x+14y=9 -35x-14y=-42 This gives me -26x=-33 which is x=33/26 so now I have found the value of x which I can plug back into the equations to find the other variables but I'm not sure if this is even correct? It seems very long just to get the answers.
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