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The major programs and languages do not provide a way to overline text as easily as they can underline text. An overline is a line appearing immediately above text, while an underline appears immediately below it.
In Microsoft Excel 2010, overline can be achieved by inserting a combining diacritical mark.
First type the text you want to overline.
Now position the letter cursor immediately to the right of the rightmost character and select the 'Insert' tab in Excel. Do not select the character itself.
Now click 'Symbol' on the ribbon to get the 'Symbol' menu.
Without changing your font, select 'Combining Diacritical Marks' in the 'subset' box.
Now double-click the symbol called "Combining Overline" and the overline will appear above your original character. You need to reposition the cursor immediately to the right of the next character to the left and do the same until all your text is overlined.
You may find that the overline is too close to the top of your text and it looks untidy. In this case, immediately before selecting the 'Insert' tab in Excel, select a bigger font size, keeping the same font style. For instance, if your original text is in Colibri 11, select Colibri 16. This method is very fiddly, and you need to reselect the font size each time you insert a single overline character. If even then the overline reverts to the lower-level type, delete the overlined text, retype it, reselect the larger font, and overline the next character to the left first.
What else can I help you with?
Is 0.6 reapeating a rational number?
Yes, 0.6 repeating (denoted as (0.\overline{6})) is a rational number. A rational number is defined as a number that can be expressed as the quotient of two integers, and (0.\overline{6}) can be represented as (\frac{2}{3}). This can be shown by setting (x = 0.\overline{6}), multiplying by 10, and then solving for (x).
Numeric value for 8000?
V'MMM, by V'I mean a V with a line over it or an special character of triangular shape, point down. Roman numeral characters greater than M (1000) use an over(sometimes underline)of characters 1/1000 times less. V with overline = 5000 X with overline = 10000 L with overline = 50000 ......... etc .........
What is complement law?
The complement law is a fundamental principle in Boolean algebra that states that the conjunction (AND operation) of a variable and its complement equals zero, while the disjunction (OR operation) of a variable and its complement equals one. Mathematically, this can be expressed as ( A \cdot \overline{A} = 0 ) and ( A + \overline{A} = 1 ), where ( A ) is a Boolean variable and ( \overline{A} ) is its complement. This law is essential for simplifying Boolean expressions and designing digital circuits.
What are some examples of bar notation?
Bar notation is a mathematical shorthand used to represent repeating decimals. For instance, the decimal (0.333...) can be expressed as (0.\overline{3}), indicating that the digit 3 repeats indefinitely. Similarly, (0.666...) can be written as (0.\overline{6}). Another example is (0.142857142857...), which can be denoted as (0.\overline{142857}), showing that the sequence "142857" repeats.
What is the Roman Numeral TXVIII?
1,018. In the middle ages, an overline multiplied the value by 1,000. Thus T is really an I with an overline, thus representing 1,000 (I = 1, T = 1 x 1,000). Normally we use M for 1,000.
What is the largest number you can write using roman numerals?
The largest number you can write using Roman numerals without an overline at any symbol is 3999 (MMMCMXCIX), and the largest possible number is 3999999 (MMMCMXCIXCMXCIX, with an overline over the first nine letters.
What is a symbol for angle bisector?
The symbol for an angle bisector is typically represented by a ray or line segment that divides an angle into two equal parts. In geometric notation, it may be denoted as ( \overline{AD} ) if ( D ) is the point on the angle's interior where the bisector intersects. Additionally, the angle bisector is often associated with the notation ( \angle ABC ) where ( D ) lies on the ray ( \overline{AC} ), indicating that ( \overline{AD} ) bisects ( \angle ABC ).
What is an example of a repeating decimal where two digits repeat and explain why the number is a rational number?
An example of a repeating decimal where two digits repeat is (0.66\overline{66}), which can be expressed as (0.66666...). This number is a rational number because it can be represented as a fraction; specifically, (0.66\overline{66} = \frac{2}{3}). Rational numbers are defined as numbers that can be expressed as the quotient of two integers, and since (0.66\overline{66}) can be converted into the fraction (\frac{2}{3}), it fits this definition.
What does 0.5 with a line on top of it mean?
The notation ( \overline{0.5} ) signifies a repeating decimal, indicating that the digit "5" repeats indefinitely. Therefore, ( \overline{0.5} ) is equivalent to the decimal 0.555..., which can also be expressed as the fraction ( \frac{5}{9} ). This notation helps to clearly denote the repeating part of the decimal.
What would be the boolean equation for an active low binary code 1101?
For an active low binary code of 1101, the corresponding boolean equation can be represented in terms of the individual bits as follows: ( \overline{A} \cdot \overline{B} \cdot C \cdot \overline{D} ), where ( A, B, C, ) and ( D ) are the bits of the binary code from the most significant to the least significant bit. This equation indicates that the output is active (logic low) when ( A ) is low (0), ( B ) is low (0), ( C ) is high (1), and ( D ) is low (0).
Can goat to eat bananas?
H f(x) = (1 - x)/(1 + x) then show that f(x) - f(1/x) = 2f(x) Solve the equation: det [[x + 2, 4], [3, x - 2]] = 0 Solve: det [[1, 2, 5], [1, x, 5], [3, - 1, 2]] = 0 2 20 -12 Solve: H log( x+y 3 )= 1/2 * (log(x) + log(y)) | prove that x ^ 2 + y ^ 2 = 7xy It log((x - y)/2) = 1/2 * (log(x) + log(y)) then prove that x ^ 2 + y ^ 2 = 6xy Prove at log( x^ prime prime x^ 3 )+ log((x ^ 4)/(x ^ x)) = 0 overline a = (1, 3, 2) . overline b = (3, 2, 1) and overline c = (- 2 - 1, 3) then find 20+8+22 overline a = (1, 1, 1) , overline b =(0,0,1) and overline c = (2, 1, 3) then fintl++ If the vectors overline a = (2, 3, 0) and overline b = (k, 1, 3) are perpendicular to each other then find the value of k. Find a unit vector perpendicular to overline a = (0, 0, 3) and overline b = (- 2, 1, - 2) . Find a unit vector perpendicular to overline a = (1, 0, 0) * z overline b = (0, 1, 0) A particle moves from the point (0,1,2) to (-1,3,2) the point under the effect of forces 7+27+3. Calculate the work done by the forces. A particle moves from the point (0,1,2) to (0,2,2) the point under the effect of forces 7+27+3 Calculate the work done by the forces. Calculate: lim x -> 2 (x ^ 2 - 4x + 4)/(x ^ 2 - 5x + 6) Calculate: lim x -> ∞ (x ^ 2 - 5x + 6)/(x ^ 2 - 2x + 8) Evaluate: lim c -> l ((x ^ 2 - 4)/(x - 2)) Evaluate: lim r -> 5 ((x ^ 4 - 81)/(x ^ 3 - 27))
What is roman numerals of 10216?
The Roman numeral for 10,216 is: _ X CCXVI The overline multiplies X (10) by 1000, making 10,000.
