The Top 10 ACT Math Formulas Youve Never Heard Of (and 55 more).

The Top 10 ACT Math Formulas You've Never Heard Of (and 55 more). Please note: I am a Harvard grad, SAT/ACT perfect scorer and full-time private tutor in San Diego, California, with 18 years and 18,000 hours of professional teaching, coaching and tutoring experience. For more helpful information, check out myACT Action Plan as well as my free e-book,Master the ACT by Brian McElroy.Google "ACT Math Formulas" and you get a grab-bag of subpar results, including an old PDF from 1996 and two popular but glaringly incomplete lists of ACT Math Formulas. The fact is that the ACT Math section has many more required formulas and concepts than the ones you can find easily online. Don't despair--I'm here to help fill the gaps.1)Law of Sines (yes, you have to memorize it now). (A / sin A) = (B / sin B) = (C / sin C)2)Law of Cosines (memorize also, just to be safe--the ACT usually provides it): c2 = a2 + b2 - 2abcosC3) Formula for an Ellipse (this was required on the June 2016 ACT) Full Equation / Equation when Centered at 0,04) Products, Sums and Determinants of Matrices (welcome to the Matrix!). How to perform matrix calculations on your TI-83 Plus or above calculator / Augmented Matrices5)Sum of the First n terms of anArithmetic Sequence and a Geometric Sequence6)Nth term of an Arithmetic Sequence and Nth term of a Geometric Sequence7) Translating logarithms (logs) to exponents and vice versa / theproduct, quotient and power rules of logarithms8)Horizontal and Slant Asymptotes9)Synthetic Division andBinomial Division (2010 June ACT #60)10) The Complex Number Plane (2016 December ACT #57) And hey, while we're at it, let's try for a full list of EVERY math formula and concept that shows up on the ACT (see below). If you feel that I've left anything out, then please let me know at mcelroy@post.harvard.edu. 11) TheQuadratic Equation (see below)12) Percentage = (Part/Whole) and Percent Change = (Difference/Original) x 10013) The Circle Proportionality Formula (Area of "Slice"/Area of Whole = Arc Length/Circumference = Measure of Inner Angle/360)14) The Formula for a Line (slope intercept y=mx+b format, standard form Ax + By = C, and point-slope format: y-y1 = m(x-x1), and the slope equation (y2-y1) / (x2-x1) ).15) All 3Quadratic Identities (unfactored to factored form)(x2-y2)=(x+y)(x-y)x2+2xy+y2=(x+y)2x2-2xy+y2=(x-y)216) The Third Side Rule for Triangles (a-b) c (a+b) if c represents the third side and b and a represent the lengths of the other two sides.17) Direct and Indirect Proportion ( (a1/b1)=(a2/b2) and (a1a2 = b1b2)18) Average = (Total / Number of things)19) Pro bability = (Desired Possibilities / Total Possibilities).20) Surface Area of a Cube =6s221) Distance = Rate x Time22) Weighted Averages 23) Simultaneous Equations / Substitution 24) Functions 25) Imaginary numbers (i) and the iterations of i. Binomial addition involving constants and i by combining like terms (adding and subtracting complex numbers)26) Multiplying by the complex conjugate of the denominator to simplify complex number fractions27) Completing the square 28) Sin x = Cos (90-x)29) Concept: the vertex of a parabola is located at the midpoint of its x-intercepts, or using the formula -b/2a30) The vertex (h,k) form of a parabola: a(x-h)2 + k31) Area of a non-right triangle = 1/2 ab sin C 32) Concept: when an upward projectile reaches its highest point, its velocity is zero.33) Concept: when an upward projectile lands, its height is zero.34) Concept: the sides of similar triangles all have the same respective proportions.35) Concept: in a system of linear equations, there i s no solution if the slopes of the two lines are the same (parallel) and the y-intercept is different. Conversely, there are infinitely many solutions is the slopes of the two lines are the same and the y-intercept is also the same.36) Concept: to find the intersections of two lines, set them equal to one another37) Concept: the zeroes or "roots" of a function are the x-coordinates where it crosses the x-axis (and where the y value outputs zero).38) Concept:the degree measure of an arc formed by an angle with its vertex on a circle is double the measure of the angle, or equal the measure of the circle if the vertex is on the center of the circle.39) Concept: the value of a function is undefined when the denominator is equal to zero. 40) Concept: the proportion of distance that you travel along the one leg of a triangle is equal to the proportion of distance that you travel along both other legs.41) The equation of a circle with center (h,k) and radius r: (x-h)2 + (y-k)2= r2 42) Poly nomial Remainder Theorem 43) Domain and Range44) Manipulating Absolute Value Inequalities45) Negative and Fractional Exponents46) Rules of Exponents: "Same Root" Tricks (multiplication = add the exponents, division = subtract the exponents, taking to a power = multiply the exponents). "Same Exponent" Trick (perform the operation on the base and keep the exponent the same for multiplication and division operations). Also know how to calculate fractional powers. 47) Parallel Lines and Transversals 48)Positive and Negative Associations in Graphs49) radians = 180 degrees50) Permutations and Combinations51) Vector Addition and Subtraction52)Area of a Trapezoid = [(a+b)/2]h53)Standard Deviation (more on SD). Standard Deviation showed up on the December 2016 ACT, but you can use your calculator (see link) to solve.54) Area of a Circle = r255) Circumference of a Circle = 2r56) Area of a Triangle = (base)(height)/257) Volume of a Rectangular solid = (length)(width)(height)58) Volume of a Cy linder = r2h59) Volume of a Cone = (1/3)r2h60) Number of degrees in an n-sided shape: (n-2)(180)61) AddingVectors in Component Form (tests #2 and #3 from the new book)62) Concept: a polynomial of Nth degree has at most N-1 changes in direction.63) Euler's Formula: Vertices + Faces - Edges = 264) Polar Coordinates: x = r cos(theta) and y = r sin(theta)65) sin2x + cos2x = 1 (#46 2018 June ACT) -----Thats all you need to know as far as formulas and concepts!YOU SHOULD ALSO KNOW THE DEFINITIONS OF THE FOLLOWING TERMS:-PEMDAS AND THE ORDER OF OPERATIONS. If you dont know what Im talking about here, talk to your math teacher, pronto! Just a reminderParentheses, Exponents, Multiplication, Division, Addition, Subtraction. Also remember that a TI-83 (perfectly legal on this test) automatically performs PEMDAS so long as you enter the expression correctly.- MEAN, MEDIAN, MODE. Mean is the same as average. Median is the number in the middle after rearranging from low to high. In the case that the list has no true middle because it has an even number of terms, find the average of the middle two. So the median of the list { 1 1 5 5 } is (1+5)/2 which equals 3. MODE is quite simply the number that appears the MOST. Multiple modes are possible if there is a tie for greatest frequency: the example I just listed, for example, has two modes, 1 and 5. To calculate the median of an odd numb er of terms, simply add 1 and divide by 2. To calculate the median of an even number of terms n, take the average of the (n/2) term and the following term. -INTEGERS. Integers are whole numbers, including zero and negative whole numbers. Think of them as hash marks on the number line. (For those who dont know what hash marks are, picture the while yardage markings on the grass of a football field.) Dont forget that zero is an integer and that negative whole numbers are integers too. Remember that -3 is less than -2, not the other way around (sounds simple but is a common mistake. If I fooled you initially with that one, think of greater than as further to the right on a number line, and less than as further to the left.-PRIME NUMBERS. Prime numbers are positive integers that are only divisible by themselves and the number 1. Be able to list all the primes you between 1 and 50remember that 1 is not a prime and there are no negative primes. By the way, 51 is not primethat question act ually showed up on a recent SAT. 17 x 3 = 51. What, you forgot your times tables for 17? ;)2,3,5,7,11,13,17,19,23,29,31,37,41,43,47,53, etcAlso, be able to use a factor tree and find all the factors of a number and perform a prime factorization of a number (this means you find a series of prime numbers that multiplies together to equal that number). The prime factorization of 18, for example, is 3 x 3 x 2.-PYTHAGOREAN TRIPLES. These are particular types of Right Triangles that just happen to have exact integers as sides. The SAT loves to use them, so know them by heart and save yourself the trouble of calculating all those roots. Here are the ones they use:3/4/5, 5/12/13, 6/8/10, 7/24/25, 8/15/17Please note that Pythagorean Triples are not the same as 45/45/90 and 30/60/90 triangles, which are provided for you at the beginning of each Math section.)-Y LESS THAN X(for example, x-7 is the correct mathematical translation of 7 less than x. Be careful because many students will write th is as 7-x, which is incorrect.)-THE WORD OF. (of always means multiply.)-DIGITS. Digits are to numbers what letters are to words. There are only 10 possible digits, 0 through 9.-MULTIPLES. The MULTIPLES of x are the ANSWERS I get when I MULTIPLY x by another INTEGER. For example the multiples of 5 are 5,10,15,20 etc. as well as 0 (a multiple of everything because anything times zero is zero) as well as -5, -10, -15 and other NEGATIVE MULTIPLES.-FACTORS. The factors of x are the answers I get when I divide x by another integer. For example the factors of 60 are 30, 20,15,12,10,6,5,4,3,2,1, as well as -5,-6,-10 etc.-REMAINDER. Remainder is the whole number thats left over after division. For example 8/3 equals 2 remainder 2. Remainder is particularly helpful on pattern and sequence problems.-CONSECUTIVE INTEGERS. Consecutive integers are integers in order from least to greatest, for example 1,2,3. The ACT may also ask for consecutive even or odd integers. For example -6,-4,-2, 0, 2, 4 etc (yes zero is even) or 1, 3, 5 etc.-SUM. Sum means the result of addition. The sum of 3 and 5 is 8. I know, duh, but youd be surprised how many students will say 15 if they are not paying close attention.-DIFFERENCE. Difference is the result of subtraction.-PRODUCT. The result of multiplication. Do not confuse with sum!-ODD AND EVEN NUMBERS. Even numbers are all the integers divisible by 2, and odd numbers are all the other integers.-POSITIVE and NEGATIVE NUMBERS. Be aware that if the problem asks for a negative number, that does not necessarily mean a negative INTEGER. -1.5 will do just fine. Zero is neither negative nor positive. Be aware of strange tricks with negatives, and that negatives taken to EVEN powers are positive and that negatives taken to ODD powers are negative.-GEOMETRY and TRIGONOMETRY. Youre going to have to remember basic geometrical concepts (180 degrees in a line, 360 degrees in a quadrilateral, 360 degrees in a circle, all radii of a circle are equal 180 d egrees in a triangle, rules of parallel lines and transversals, trapezoids have two parallel sides, vertical angles are congruent, perpendicular lines have slopes that are negative reciprocals of each other.). Also be familiar with the formulas for Sine (Opposite/Hypotenuse), Cosine (Adjacent/Hypotenuse) and Tangent (Opposite/Adjacent) in right triangles, which can be remembered with the acronym "SOHCAHTOA". Also be familiar with the inverses of these trigonometric functions and the reciprocals of these trigonometric functions -- the reciprocal of sine is cosecant (csc), the reciprocal of cosine is secant (sec), and the reciprocal of tangent is cotangent (cot). That being said, the fewer formulas you need to remember, the more you can focus on technique, and good technique is the true key to an excellent ACT score. I dont teach my students unnecessary formulas because I can teach them to find the answers using a more logical approach to the problem.This isnt math class, where you have to show your work or use proper technique. This is the ACT, where the only thing that matters is that you get the correct answer as quickly as possible. So you can get away with shortcuts galore. This is why the best ACT math tutors focus on problem recognition, technique and logic more than they focus on pure memorization.In other words, these formulas are a great tool and do allow for shortcuts, but you should also focus on logical and conceptual understanding skills, and taking plenty of practice ACTs to hone your skills. Studying a formula sheet is no substitute for putting in the hard work by taking at least 8-10 full ACT practice tests, and then reviewin g the results properly, waiting a few weeks, and then re-trying questions from scratch (in other words, without seeing your previous work, a.k.a. "blind review") until you can answer them correctly. For more information you can read myACT Action Plan.Good luck,Brian