It is known that the area of a rectangle is 4a2-6ab + 2a, and one side of the rectangle is 2A
The other side of the rectangle = (4a2-6ab + 2a) △ 2A = 2a-3b + 1, that is, the other side of the rectangle is 2a-3b + 1
RELATED INFORMATIONS
- 1. It is known that the area of a rectangle is the square of a-3ab + 2a, and the length of one side is 2A. Find the perimeter of the rectangle
- 2. Known: a rectangle area is 4A ^ 2-6a, its side length is 2A. Find the perimeter of the rectangle
- 3. The perimeter of a rectangle is 4A + ab. if the length of one side of the rectangle is represented by a, then the area of the rectangle is? Please explain the reason
- 4. The area of a rectangle is 2A cube-4a square B + 2a, and its width is 2A. Find the length of the rectangle
- 5. The area of triangle is the third power of 4A - 2A square B + 6ab square, and the length of one side is 2A (1) If a = 2, B = 1, find the height of (1)
- 6. What is the area of a triangle iron plate if its bottom length is (2a + 6b) meters and its height is (4a-5b) meters emergency
- 7. It is known that the perimeter of the triangle is (4a + 5b) cm, the first side is (2a-b) cm, and the second side is (a-b) cm longer than the first side. The side length of the triangle is calculated
- 8. If the perimeter of the triangle is 48, the first side is 4A + 3b, and the second side is 2a-b less than 2 times of the first side, then the third side is 4A + 3B______ .
- 9. If the perimeter of the triangle is 48, the first side is 4A + 3b, and the second side is 2a-b less than 2 times of the first side, then the third side is 4A + 3B______ .
- 10. The lengths of two sides of a triangle are a + B, 2a-b, and the perimeter of a triangle is 4A + 1 / 2B (a > b) (1) Find the length of the third side of the triangle; (2) When a = 3, B = 2, write the length of each side of the triangle
- 11. If the area of a rectangle is (6ab2 + 4a2b) cm2 and the length of one side is 2bcm, its perimeter is______ cm.
- 12. The square of (2a + b) - 8ab factorization factor; a, B are any real numbers, the total value of the quadratic power of a + the quadratic power of b-2a-4b + 8 is : A. negative B. positive c.0 D. non negative
- 13. Given that a and B are real numbers, and the square of a plus the square of B minus 2A minus 4B plus 5 is equal to 0, find the value of 2009 power of a multiplied by negative 2 power of B, and ask for the help of Dashen
- 14. A polynomial minus A2-B2 equals A2 + B2 + C2, then If a polynomial minus A2-B2 equals A2 + B2 + C2, then the original polynomial is? Hurry!
- 15. Proof: no matter a, B take any real number, the value of polynomial a * b * + b * - 6ab-4b + 14 is not less than 1
- 16. 1、 It is proved that when a and B take any real number, the value of square of polynomial a + square of polynomial b-2a + 8b + 18 is always positive 2、 It is proved that for any real number x, y, the square of polynomial 2x-6xy + 9y-4x + 5 is always positive There are two questions,
- 17. It is known that f (AB) = f (a) + F (b) holds for any real number a and B. find the values of F (0) and f (1) F (0) = f (0) + F (0), so f (0) = 0 F (1) = f (1) + F (1), so f (1) = 0 Why is it all equal to zero?
- 18. It is known that f (AB) = f (a) + F (b) holds for any real number a and B 1) Finding the value of F (1) and f (0) 2) If f (2) = P, f (3) = q (P, q are constant), find the value of F (36) 3) Prove f (1 / x) = - f (x)
- 19. Given that f (x) holds for any real number a, B, f (AB) = f (a) + F (b) (1) find the values of F (0) and f (1) F (0) = f (0) + F (0), so f (0) = 0 F (1) = f (1) + F (1), so f (1) = 0 I can't understand the solution process. Why is it equal to zero?
- 20. The solution set of inequality (x + 1) (X-2) / (x-4) (x + 3) < 0 is