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- Question #de1b8 + Example - Socratic
Definitions of Energy vary a little by state standards And scientists aren't always very good about using terms consistently Chemists, for example, like to speak of entropy instead If you are in a state which uses the SCREAM acronym, you may have the choices: Sound, Chemical, Radiant, Electrical, Atomic, and Mechanical You could make a case for many of these so-called forms of energy
- How do you evaluate #9^ {2}-7^ {2}2^ {2}\times 3^ {2}#? - Socratic
-1683 >"when evaluating expressions with mixed operations " "there is a particular order that must be followed" "follow the order as set out in the acronym PEMDAS
- How do you simplify 3^ { 4} - 24\div 4\cdot 4- \frac - Socratic
3^4-24-:4*4-54 6=color (blue)48 Simplify: 3^4-24-:4*4-54 6 This expression can be simplified by using the order of operations, which is represented by the acronym PEMDAS , which means: Parentheses (brackets) Exponents (powers) Multiplication and Division from left to right because they are equal in rank
- Question #8b990 - Socratic
The acronym "OIL RIG" is used to help remember this : "Oxidation Is Loss, Reduction Is Gain" You may first have heard oxidation in relation to say, rusting of iron where we say Iron has been oxidised: "Iron" + "oxygen" to "hydrated iron (iii) oxide" Although the formation of an oxide helps make an intuitive link to iron being oxidised, we can
- Solve using FOIL? (x^2+6) (x^2+3) - Socratic
then multiply the OUTER terms So, that's the first term in the first binomial, and the last one in the second binomial: #x^2 * 3 = 3x^2#
- How do you evaluate (\frac { 6} { 5} ) ^ { 2} \div ( \frac { 6} { 5 . . .
36 25 >"when evaluating expressions with "color(blue)"mixed operations" "there is a particular order that must be followed" "follow the order as set out in the acronym PEMDAS" ["P-parenthesis (brackets),E-exponents (powers)" "M-multiplication, D-division, A-addition, S-subtraction ]" =36 25-:1larrcolor(red)"brackets powers" =36 25larrcolor(red)"division"
- How do you simplify (-8)\times [ (-78)\div (-13)- (-9)]^ {2 . . . - Socratic
When evaluating expressions with mixed operations there is a particular order that must be followed Follow the order as set out in the acronym PEMDAS (Parenthesis (brackets), Exponents (powers), Multiplication, Division, Addition and Subtraction) Here we must evaluate the expression inside the square bracket first (− 8) × [6 + 9]2 ← division = (− 8) × [15]2 = (−8) × 225 ←
- Answers created by Jordan Johnson - Socratic
When writing dialogue, with what type of speech would you be most likely to use slang? How does Dickens use satire to poke fun at funerals in Chapter 35 of Great Expectations? What is an example of periphrasis in any famous speech? What is an acronym for litotes? What are some examples of expository devices and rhetorical devices?
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