What truly sets macs apart is the desktop as they don't have a separate tower system like most other systems do
Answer:
Hope it helps dude the second paragraph is not part of your question but it's good to give information about the answer .
Explanation:
He should use lan network.
A local area network (LAN) is a group of computers and associated devices that share a common communications line or wireless link and typically share the resources of a single processor or server within a small geographic area (for example, within an office building). Usually, the server has applications and data storage that are shared in common by multiple computer users. A local area network may serve as few as two or three users (for example, in a home network) or as many as thousands of users (for example, in an FDDI network).
Answer:
(10000000)₂ = -128 in decimal
(11001100)₂ = -52 in decimal
(10110111)₂ = -73 in decimal
Explanation:
<u>NOTE:</u> If Most Significant Bit is 0, it is positive number and if MSB is 1, it is negative number. If number is positive we can simply convert it to decimal. But if number is negative, follow following formula:
- (complement of the number) +1
<u>EXAMPLE 1</u>
(10000000)₂
(01 1 1 1 1 1 1)₂ ↔ complement of the number
<u>+ 1</u>
(10000000)₂ = 1 ×= 128 (magnitude in decimal)
But we remember MSB was 1 so answer is -128.
<u>EXAMPLE 2</u>
(1 1 0 0 1 1 00)₂
(0 0 1 1 0 0 1 1)₂
<u>+ 1 </u>
(0 0 1 1 0 1 0 0)₂ = 52 (magnitude in decimal)
But we remember MSB was 1 so answer is -52.
<u>EXAMPLE 3</u>
(1 0 1 1 0 1 1 1)₂
(0 1 00 1 000)₂
<u>+ 1 </u>
(01 00 1 00 1)₂ = 73 (magnitude in decimal)
But we remember MSB was 1 so answer is -73.
Answer:
Polynomial Zero() ::= return the polynomial p(x)=0
Boolean isZero(poly) ::= return (poly == 0)
Coefficient Coeff(poly , expon) ::= If (expon tex2html_wrap_inline93 poly) return its corresponding coefficient else return 0
Exponent LeadExp(poly) ::= return the degree of poly
Polynomial Remove(poly , expon) ::= If (expon tex2html_wrap_inline93 poly) remove the corresponding term and return the new poly else return ERROR
Polynomial SingleMult(poly , coef , expon) ::= return poly tex2html_wrap_inline105 coef x tex2html_wrap_inline107
Polynomial Add(poly1 , poly2) ::= return poly1 + poly2
Polynomial Mult(poly1 , poly2) ::= return poly1 tex2html_wrap_inline105 poly2
end Polynomial
Answer:
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