why 6.25^-2 is 0.0256? why not 1/39.0625? 0 Step 2 of 4 Done Then the expression...
12:3 Step 1 Expression for work done by the frictional force on an object is, Here, is coefficient of kinetic friction, mis mass of object, g is gravitational acceleration, and is displacement. Work done is path dependent parameter. In the given case, the person put the box at starting position. Hence, the displacement of the box is zero. Therefore, the work done by the person on the box is zero. Thus, the correct option is oncept Check 6.1 A person...
Step 1 Expression for work done by the frictional force on an object is, Here, k is coefficient of kinetic friction, m is mass of object, g is gravitational acceleration, and d is displacement, Work done is path dependent parameter. In the given case, the person put the box at starting position. Hence, the displacement of the box is zero. Therefore, the work done by the person on the box 1S Zero Thus, the correct option is Concept Check 6.1...
For the given circuit diagram: (1) Obtain the Boolean expression step by step (2) Obtain the truth table step by step. (3) From the result of (1) make the truth table of output F and compare with the result of (2) (4) Draw an equivalent circuit for F with fewer NAND gates
How is the last step done done N-1 3 i⅔n2 e 10 10 N _ n-0 N-1 3 i⅔n2 e 10 10 N _ n-0
Please solve step by step clearly ? Question 2: (20 points) Show the minimized Boolean expression for each of the following K-maps Y CD AB 00 01 11 10 Y CD AB 00 01 11 10 X 0 01 1 0 0 Y CD AB 00 01 11 10 Y CD AB 00 01 11 10 1 0 x 0 1 1 0 0 0 10
1. a) Write the equilibrium constant expression, for the reaction: H2(g) + 12(g) → 2 HI (g) b) What is the equilibrium constant, K if at equilibrium, [HI] = 5.0 x10- M; [H2] = 6.9 x10-2M; [12] = 6.9 x10-2 M?
Show that the matrix is not diagonalizable. 2 43 0 21 0 03 STEP 1: Use the fact that the matrix is triangular to write down the eigenvalues. (Enter your answers from smallest to largest.) -- STEP 2: Find the eigenvectors x, and X corresponding to d, and 12, respectively, STEP 3: Since the matrix does not have Select linearly independent eigenvectors, you can conclude that the matrix is not diagonalizable.
How come for this problem we didn’t have to convert Step 4 of 4 Done 2U 2U d o A 2x(15mJ)(1.2mm (8.854× 10-12 Fm)(0.0025 ㎡) -40kV
question, you are required to show your solution step by step. 1) Convert the following Numbers A) (1100110011)2 = (.) 10 B) (513)19= (1 : 12 C) (5A)16= ( )10- ( " )2 2) Find the Boolean algebra expression for the following system and create a truth table.. RE 3) Draw a truth table for AB (A+B) 4) Evaluate the following expression when A=1, B =0, and C= 1 F= A +ĀB + BĀ + CB
step by step please Consider the following 2 -1 A = 0-2 -2 0 0 0, P- -1 0 1 -3 04 0 1 2 (a) Verify that A is diagonalizable by computing p-1AP. p-1AP = 11 (b) Use the result of part (a) and the theorem below to find the eigenvalues of A. Similar Matrices Have the Same Eigenvalues If A and B are similar n x n matrices, then they have the same eigenvalues. (11, 12, 13) =(