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Drs. Glenn Feltham and David Ambrose began operations of their physical therapy clinic, called Northland Physical Therapy, on January 1, 2020. The annual reporting period ends December 31. The trial balance on January 1, 2021, was as follows (the amounts are rounded to thousands of dollars to simplify): Transactions during 2021 (summarized in thousands of dollars) follow: a. Borrowed $\$ 31$ cash on July 1,2021 , signing a six-month note payable. b. Purchased equipment for $\$ 34$ cash on July 2, 2021. c. Issued additional shares of common stock for $\$ 5$ on July 3 , d. Purchased software on July $4, \$ 3$ cash. e. Received supplies on July 5 on account for future use, $\$ 7$. $f$. Recorded revenues on December 6 of $\$ 64$, including $\$ 8$ on credit and $\$ 56$ received in cash. g. Recognized salaries and wages expense on December 7 of $\$ 39$; paid in cash. h. Collected accounts receivable on December $8, \$ 9$. i. Paid accounts payable on December $9, \$ 10$. j. Received a $\$ 3$ cash deposit on December 10 from a hospital for a contract to start January 5, 2022. Data for adjusting journal entries on December 31: k. Amortization for 2021, \$3. l. Supplies of $\$ 3$ were counted on December 31, 2021. m. Depreciation for 2021, \$4. n. Accrued interest of $\$ 1$ on notes payable. o. Salaries and wages incurred but not yet paid or recorded, $\$ 3$. p. Income tax expense for 2021 was $\$ 4$ and will be paid in 2022 . {|l|l|l|} lticolumn{1}{|c|}{ For the Year Ended December 31, 2021 } \\ lticolumn{1}{|c|}{ Account Titles } & Debit & lticolumn{1}{c|}{ Credit } \\ Cash & & \\ Accounts Receivable & & \\ Supplies & & \\ Equipment & & \\ Accumulated Depreciation & & \\ Software & & \\ Accumulated Amortization & & \\ Accounts Payable & \\ Notes Payable (Short-term) & \\ Salaries and Wages Payable & \\ Interest Payable & \\ Income Taxes Payable & \\ Deferred Revenue & \\ Common Stock & \\ Retained Earnings & \\ Service Revenue & \\ Salaries and Wages Expense & \\ Supplies Expense & \\ Depreciation Expense & \\ Amortization Expense & \\ Interest Expense & \\ Totals & \\
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Equipment \[ 603,140 \] Bonds Payable \[ 1,002,690 \] Accumulated Depreciation-Equipment \[ 60,000 \] Franchises \[ 160,000 \] Common Stock (\$5 par) Treasury Stock \[ 194,140 \] Patents \[ 195,000 \] Retained Earnings Balance (before Net Income) Paid-in Capital in Excess of Par Totals \[ \$ 12,352,970 \] \[ 1,003,140 \] {rr} 80,690 \\ $812,352,970$ & $\$ 12,352,970$ \\ Prepare a balance sheet at December 31, 2025, for Novak Corporation. (Ignore income taxes). (List Current Assets in order of liquidity. List Property, Plant, and Equipment in order of Land, Buildings, and Equipment. Enter account name only and do not provide the descriptive information provided in the question.)
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6. Consider the following heap: You insert the value of 81 into the heap. After the heap invariant is restored, what is the final array representation of this max heap? A. $98,80,96,45,81,49,83,6,65$ B. $98,96,81,83,65,80,49,45,6$ C. $98,81,96,80,65,49,83,45,6$ D. $98,81,96,80,65,49,83,6,45$ E. none of the above
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7. Consider a min-heap represented by the following array: \[ [50,53,61,57,70,79,68,71] \] Perform the following operations using the algorithms for binary heaps discussed in lecture. Ensure the heap property is restored at the end of each individual heap operation. 1. Push the value 40 into the min-heap 2. Push the value 54 into this min-heap 3. Update element 71 to have value 49 4. Update element 61 to have value 90 What does the array representation look like after all four operations are completed? A. $[40,49,79,50,54,90,68,53,57,70]$ B. $[40,49,68,50,54,79,90,53,57,70]$ C. $[40,49,50,53,70,79,54,57,90,68]$ D. $[40,49,50,53,54,90,68,79,57,70]$ E. None of the above
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4. Consider an empty min-heap priority queue. If you insert the elements $12,4,9,27,13,2$, and 6 into the heap (in that order, following the algorithm specified in lecture) and remove the most extreme element twice, what are the possible array representations of the heap? Select all that apply. A. $[6,9,12,13,27]$ B. $[6,9,27,12,13]$ C. $[6,12,9,27,13]$ D. $[27,13,12,9,6]$ E. none of the above
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Given a 2-input 1-output RBF network with two RBF centers at T1=[0,0] and T2=[1,0] with two weights w1 and w2, and one bias w0, four input vectors X1=[0,0], X2=[0,0.6], X3=[1,0], X4=[1,0.6] with the corresponding desired output vector D=[1,0,0,0], and the Gaussian function consisting of the squared l2-norm operator is used as the radial basis function.Show the step-by-step calculation to obtain the combined weights [w0,w1,w2] to recall the four corresponding outputs Y1, Y2, Y3, Y4 and submit the sum of the 3 weight values as Your Answer by typing its numerical value (rounded to 4 decimal places) into the Answer Box below. Hint: A minimum resolution of 6 decimal places for step-by-step calculation is required.
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Name: UTC ID: Problem 1- Analytical study of boost converters (55 points) Important: Just provide the final numbers. Do not include calculations. The boost converter of figure below has the following parameters: \[ {l} V_{s}=30 {~V}, \quad V_{o}=100 {~V}, \quad \quad f=30 {kHz} \\ R=x , \quad L=10 y {H}, \quad C= {zmF} \] where $x, y$, and $z$ are the three digits of your UTC ID from left to right ( $ line{x y z}$ ). For example, if your UTC ID is $A B C 123$, then $x=1, y=2, z=3$ and $R=1 , L=20 H, C=3 {mF}$. 1-1- Calculate the following values: {|c|l|c|c|c|} & lticolumn{1}{|c|}{ Parameter } & Value & Unit & points \\ 1 & Resistor $(R)$ & & $ $ & 1 \\ 2 & Inductor $(L)$ & & $ H$ & 1 \\ 3 & Capacitor $(C)$ & & $m F$ & 1 \\ 4 & Duty Cycle or duty ratio $(D)$ & & - & 4 \\ 5 & Maximum inductor current $ ft(I_{L, \max } )$ & & $A$ & 4 \\ 6 & Minimum inductor current $ ft(I_{L, \min } )$ & & $ {A}$ & 4 \\ 7 & Output voltage ripple $ ft( V_{o} )$ & $ H$ & 5 \\ 8 & {l} Minimum inductance for continuous current \\ condition $ ft(L_{ {min }} )$ & & & 5 \\ 1-2- Based on the calculations above, does the converter work in continuous current mode or discontinuous current mode? (5 points). Answer:
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Gitano Products operates a job-order costing system and applies overhead cost to jobs on the basis of direct materials used in production (not on the basis of raw materials purchased). Its predetermined overhead rate was based on a cost formula that estimated $\$ 110,500$ of manufacturing overhead for an estimated allocation base of $\$ 85,000$ direct material dollars to be used in production. The company has provided the following data for the just completed year: {lr} Purchase of raw materials & $\$ 134,000$ \\ Direct labor cost & $\$ 81,000$ \\ Manufacturing overhead costs: & \\ Indirect labor & 106,100 \\ Property taxes & $\$ 8,400$ \\ Depreciation of equipment & $\$ 15,000$ \\ Maintenance & $\$ 15,000$ \\ Insurance & $\$ 9,400$ \\ Rent, building & $\$ 39,000$ {lrl} & Beginning & Ending \\ Raw Materials & $\$ 28,000$ & $\$ 16,000$ \\ Work in Process & $\$ 47,000$ & $\$ 38,000$ \\ Finished Goods & $\$ 74,000$ & $\$ 61,000$ Required: 1. Compute the predetermined overhead rate for the year. 2. Compute the amount of underapplied or overapplied overhead for the year. 3. Prepare a schedule of cost of goods manufactured for the year. Assume all raw materials are used in production as direct materials. 4. Compute the unadjusted cost of goods sold for the year. Do not include any underapplied or overapplied overhead in your answer. 5. Assume that the $\$ 38,000$ ending balance in Work in Process includes $\$ 8,300$ of direct materials. Given this assumption, supply the information missing below:
