Karnaugh map reduction f (a, B, C, d) = ∑ m (2,3,6,7,8,10,12,14), please draw Karnaugh map
F=AD'+A'C
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- 1. Using Karnaugh map to simplify the following logic functions: Y (a, B, C, d) = ∑ m (2,3,5,7,8,9) + ∑ D (10,11,12,13,14,15) It can be mapped, but I hope the process can be more detailed,
- 2. Simplification of F (a, B, C, d) = ∑ (2,3,6,7,8,10,12,14) by Karnaugh map method
- 3. Given that the equation x minus 6x + q = 0 to the second power can be reduced to the form of (X-P) square = 7, then what can the square of X - 6x + P = 0 be reduced to
- 4. Given that the equation x minus 6x + q = 0 to the second power can be reduced to the form of (X-P) square = 7, then what can the square of X - 6x + q = 0 be reduced to kuai
- 5. Simplified into a general form of quadratic equation, please explain, thank you 3x square + 1 = 6x (3x-2) (x + 1) = x (2x-1)
- 6. Integral equation reduced to differential equation Y (T) = 2 / (E-1) ∫ e ^ ty (s) ds (integral limit is 0 to 1) - e ^ t If you don't simplify it, tell me what this integral equation means. How can I get t and s in the right integral, and then subtract t
- 7. Simplify √ (4-2 √ 3) to the form of a + B √ 3
- 8. What is a ^ 2 + B ^ 2 + C ^ 2-ab-bc-ac reduced to?
- 9. How can a ^ 3-B ^ 3 + C ^ 3 + A ^ 2 * B-A * B ^ 2 + BC ^ 2-B ^ 2 * c-abc = 0 be reduced to (a + B + C) (a ^ 2 + C ^ 2-B ^ 2-ac) = 0 How to simplify the process
- 10. Simplification: (B-C) / (a ^ 2-ab-ac + BC) + (C-A) / (b ^ 2-bc-ab + AC) + (a-b) / (C ^ 2-ac-bc + AB) Simplification: (b-c)/(a^2-ab-ac+bc)+(c-a)/(b^2-bc-ab+ac)+(a-b)/(c^2-ac-bc+ab)
- 11. Using Karnaugh map, the following functions are reduced to the simplest and one or expression f (a, B, C, d) = ∑ m (0,2,4,6,8,10) ..
- 12. Karnaugh map reduction y (a, B, C, d) = ∑ m (0,13,14,15) + ∑ D (1,2,3,9,10,11)
- 13. Karnaugh map reduction f (a, B, C, d) = ∑ m (0, 2, 8, 9, 10, 11, 13, 15)
- 14. Using Karnaugh map to simplify L (a, B, C, d) = ∑ m (0,1,2,5,6,8,9,10,13,14)
- 15. Finding the simplest and or and expression f (a, B, C, d) = ∑ m (0,2,7,13,15) + ∑ D (1,3,4,5,6,8,10) by Karnaugh map reduction
- 16. Karnaugh map method reduces the function to the simplest and or expression F 2 (a, B, C, d) = ∑ m (0,1,2,4,5,9) + ∑ D (7,8,10,11,12,13). Please provide Karnaugh map
- 17. As shown in the figure, in known triangle ABC, angle c = 90 degrees, ab = 10, BC = 6, AC = 8, P is the intersection of bisector of angle BAC and angle ABC, and the distance from point P to BC is calculated
- 18. Given sin α + cos α = 1 / 5, π ≤ α ≤ 2 π, the value of Tan α is obtained
- 19. The perimeter of a rectangle is 20 cm. If its length and width are in whole centimeters, how many possible values of the area of the rectangle?
- 20. It is known that the left and right focal points of the ellipse x2a2 + y2b2 = 1 (a > b > 0) are F1 and F2 respectively. If there is an intersection p between the straight line with an inclination angle of 30 ° and the ellipse and the PF2 ⊥ X axis, then the eccentricity e of the ellipse is () A. 33B. 32C. 22D. 23