The roots of the equation 2x² +px+q are (2alpha+beta) and (alpha+2Beta).Calculate the value of p & value of q?

6 ANSWERS

1. 
   

   Consider quadratic equation ax^2 + bx + c = 0
   
   Sum of its roots = -b/a
   
   and product of its roots = c/a
   
   In the given problem, a = 2, b = p, c = q
   
   Sum of roots = -b/a
   
   Or 2alpha+beta + alpha+2beta = -p/2
   
   Or 3alpha + 3beta = -p/2
   
   Or 6alpha + 6beta = -p
   
   Or 6(alpha + beta) = -p
   
   Or p = -6(alpha + beta)
   
   Product of roots = c/a
   
   Or (2alpha+beta)(alpha+2Beta) = q/2
   
   Or q = 2*(2alpha+beta)(alpha+2Beta)
   
   Ans:
   
   p = -6(alpha + beta)
   
   q = 2*(2alpha+beta)(alpha+2Beta)
   
   

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2. 
   

   Simply replace each root in the equation. You replace in turn the x with  (2alpha+beta) and (alpha+2Beta). Thus you have a system with 2 equations and 2 unknowns:
   
   2(2alpha+beta)² + p(2alpha+beta) + q = 0
   
   and                                                                 =>
   
   2(alpha+2beta)² + p(alpha+2beta) + q = 0
   
   p(2alpha+beta) + q = -2(2alpha+beta)²
   
   and                                                                 =>
   
   p(alpha+2beta) + q = -2(alpha+2beta)²  |(-1)
   
   Multiply the second equation with -1 and add the 2 equations term by term. You get the following equation:
   
   p(2alpha+beta) + q - p(alpha+2beta) - q = -2(2alpha+beta)² + 2(alpha+2beta)² =>
   
   p(2alpha + beta - alpha - 2beta) = -2(4alpha² + 4alphabeta + beta²) + 2(alpha² + 4alphabeta + 4beta²)  =>
   
   p(alpha - beta) = -8alpha² -8alphabeta -2beta² + 2alpha² + 8alphabeta + 8beta² =>
   
   p(alpha - beta) = -6alpha² + beta² =>
   
   p(alpha - beta) = -6(alpha² - beta²) =>
   
   p(alpha - beta) = -6(alpha - beta)(alpha + beta) =>
   
   p = -6(alpha + beta)
   
   Thus you found the value for p. Let's consider now the first equation from the system at the beginning of my reply:
   
   2(2alpha+beta)² + p(2alpha+beta) + q = 0
   
   Now we know that p = -6(alpha + beta)
   
   Let's replace p in the equation with this value and find the value for q:
   
   2(2alpha+beta)² + -6(alpha + beta)(2alpha+beta) + q = 0 =>
   
   q = -2(2alpha+beta)² + 6(alpha + beta)(2alpha+beta) =>
   
   q = -2(4alpha² + 4alphabeta + beta²) + 6(2alpha² + alphabeta + 2 alphabeta + beta²) =>
   
   q = -8alpha² - 8alphabeta -2beta² + 12alpha² + 18alphabeta + 6beta² =>
   
   q = 4alpha² + 4beta² + 10alphabeta =>
   
   q = 2(2alpha + beta)(alpha + 2beta)
   
   Thus, the solution is:
   
   p = -6(alpha + beta)
   
   q = 2(2alpha + beta)(alpha + 2beta)

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3. 
   

   I assume that the "equation" is 2x² +px+q =0 not 2x² +px+q .
   
   Then sum of roots = -p/2 = 3(alpha+beta) so
   
   p = - 6(alpha+beta)
   
   and q/2 = product of roots so q =2[2(aplpha)^2 + 5(alpha)(beta) + 2(beta)^2]

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4. 
   

   let us call alpha a and beta b. so, the roots are 2a + b and a + 2b.
   
   the sum of the roots is -p/2
   
   (2a+b) + (a+2b) = -p/2
   
   3(a+b) = - p/2
   
   p = - 6(a+b).
   
   the product of the roots is q/2:
   
   (2a+b)*(a+2b) = q/2.
   
   q = 2 * (2a+b) (a+2b).
   
   

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5. 
   

   Create two simultaneous equations.  
   
   1.  Substitute (2 alpha + beta) for x and solve for p.
   
   2.  Substitute (alpha + 2 beta) for x and solve for p.
   
   Solve the simultaneous equations.

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6. 
   

   just say that the roots are 2a+b and a+2b.
   
   * if we have equation (ax^2+bx+c)=0 and we can factorize it to (dx+e)+(fx+g), we know that the roots are -e/d and -g/f, and we know that a=df, b = ef+dg , c= eg.
   
   -b/a = -e/d -g/f which is first root+ second root,
   
   c/a =eg/df which is first root * second root.
   
   Based on that, now we get :
   
   1. 3a+3b=-p/2
   
   2. (a+2b)(b+2a)=q/2
   
   So, we get the value of p and q:
   
   1.  p=-6a-6b
   
   2. q=2(2a^2+5ab+2b^2)=4a^2+10ab+4b^2
   
   

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