Examples of ordered pair in the following topics:
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- If it is $>$ or $<$, then use a dotted or dashed line, since ordered pairs found on the line would result in a false statement.
- Shading indicates all the ordered pairs in the region that satisfy the inequality.
- For example, if the ordered pair is in the shaded region, then that ordered pair makes the inequality a true statement.
- These overlaps of the shaded regions indicate all solutions (ordered pairs) to the system.
- All possible solutions are shaded, including the ordered pairs on the line, since the inequality is $\leq$ the line is solid.
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- In an equation where $x$ is a real number, the graph is the collection of all ordered pairs with any value of $y$ paired with that real number for $x$.
- For example, to graph the equation $x-1=0, $ a few of the ordered pairs would include:
- After substituting the rest of the values, the following ordered pairs are found:
- After graphing the ordered pairs and connecting the points, we see that the set of (infinite) points follows this pattern:
- Construct the graph of an equation by finding and plotting ordered-pair solutions
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- Allowing $y=f(x)$, where $f(x)=|x|$, some ordered pair examples of $(x,|x|)$ are:
- Some ordered pair examples are:
- Those points satisfy the first part of the function and create the following ordered pairs:
- For the middle part (piece), $f(x)=3$ (a constant function) for the domain $1ordered pairs are:
- For the last part (piece), $f(x)=x$ for the domain $x>2$, a few ordered pairs are:
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- In order for a linear system to have a
unique solution, there must be at least as many equations as there are
variables.
- The solution to a system of linear
equations in two variables is any ordered pair that satisfies each
equation independently.
- In this example, the ordered pair (4, 7) is the
solution to the system of linear equations.
- We can verify the solution
by substituting the values into each equation to see if the ordered pair
satisfies both equations.
- An independent system has exactly one solution pair $(x, y)$.
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- Bond order is the number of chemical bonds between a pair of atoms.
- Bond order is the number of chemical bonds between a pair of atoms; in diatomic nitrogen (N≡N) for example, the bond order is 3, while in acetylene (H−C≡C−H), the bond order between the two carbon atoms is 3 and the C−H bond order is 1.
- Bond order indicates the stability of a bond.
- In a more advanced context, bond order does not need to be an integer.
- For a bond to be stable, the bond order must be a positive value.
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- ., it is a paired difference test).
- Let $N$ be the sample size, the number of pairs.
- Exclude pairs with $\left|{ x }_{ 2,i }-{ x }_{ 1,i } \right|=0$.
- Order the remaining pairs from smallest absolute difference to largest absolute difference, $\left| { x }_{ 2,i }-{ x }_{ 1,i } \right|$.
- Rank the pairs, starting with the smallest as 1.
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- In covalent molecules, atoms share pairs of electrons in order to achieve a full valence level.
- Other elements in the periodic table react to form bonds in which valence electrons are exchanged or shared in order to achieve a valence level which is filled, just like in the noble gases.
- It therefore has 7 valence electrons and only needs 1 more in order to have an octet.
- In order to achieve an octet for all three atoms in CO2, two pairs of electrons must be shared between the carbon and each oxygen.
- These are 'lone pairs' of electrons.
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- Getting at least one double six with 24 throws of a pair of dice?
- To make up for this, a pair of dice should be rolled six times for every one roll of a single die in order to get the same chance of a pair of sixes.
- Now, when you throw a pair of dice, from the definition of independent events, there is a $(\frac{1}{6})^2 = \frac{1}{36}$ probability of a pair of 6's appearing.
- That is the same as saying the probability for a pair of 6's not showing is $\frac{35}{36}$.
- Therefore, there is a probability of $(\frac{36}{36}) - (\frac{35}{36})^{24}$ of getting at least one pair of 6's with 24 rolls of a pair of dice.
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- When two sets of observations have this special correspondence, they are said to be paired.
- Two sets of observations are paired if each observation in one set has a special correspondence or connection with exactly one observation in the other data set.
- To analyze paired data, it is often useful to look at the difference in outcomes of each pair of observations.
- It is important that we always subtract using a consistent order; here Amazon prices are always subtracted from UCLA prices.
- Using differences between paired observations is a common and useful way to analyze paired data.
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- Transition metals can act as Lewis acids by accepting electron pairs from donor Lewis bases to form complex ions.
- The modern-day definition of a Lewis acid, as given by IUPAC, is a molecular entity—and corresponding chemical species—that is an electron-pair acceptor and therefore able to react with a Lewis base to form a Lewis adduct; this is accomplished by sharing the electron pair furnished by the Lewis base.
- One coordination chemistry's applications is using Lewis bases to modify the activity and selectivity of metal catalysts in order to create useful metal-ligand complexes in biochemistry and medicine.
- All these metals act as Lewis acids, accepting electron pairs from their ligands.