Given a = {a, B, 2}, B = {2a, b square, 2}, and satisfying a = B, find the value of a and B
a=0 b=1
a=0 b=0
RELATED INFORMATIONS
- 1. Known: a + B = 2A, B = 1. Find the value of a square + b square, (a-b) square
- 2. Given a = {a, B, 2} B = {2a, the square of B, 2} and satisfying a = B, find the value of a, B
- 3. What is the square of [(2a + b) - the square of B] / (- 2A) equal to?
- 4. (- 2A) square by (a-b-ab)=
- 5. The square of (2a + b) multiplied by the square of (2a-b)
- 6. The second problem is as follows: a (a-b) - B (a + b) =?
- 7. (- 2A) times a - (- 2A) square
- 8. Given that x, y ∈ R, try to compare the size of X & # 178; + Y & # 178; + 1 and XY + X
- 9. Given x + y = 2, xy = 0, find X & # 178; + Y & # 178; and (X-Y) 178;
- 10. If X & # 178; - ax + 2a-4 is a complete square, find the value of A
- 11. If a = - 2, a + B + C = - 2.8, find the value of the square (- B-C) - 3.2a (c + b) of the algebraic formula a?
- 12. The square of a = 2A · a may be () a.0 B.1 C.2 D.3
- 13. If A-B = 2, a-c = - 1, then the square of (2a-b-c) + the square of (C-B) is ()
- 14. If (M & # 178; + n & # 178;) (M & # 178; + n & # 178; - 1) = 6, then M & # 178; + n & # 178; =? If X & # 178; - 2x-2 = (X & # 178; - 4x + 3)
- 15. 5678 to 0.01
- 16. 1234+5678×2÷1+100=?
- 17. 2.5678/0.88=
- 18. What's the answer to a & # 178; + 2A?
- 19. It is known that the length of the hypotenuse ab of the triangle ABC is √ 5, and the lengths of the two corners are the two real roots of the quadratic equation of one variable χ & # 178; - (2a + 1) χ + 2A = 0
- 20. Calculation (1 / 3A & # 178; B ^ 3) (- 15A & # 178; B & # 178;)