A worksheet on solving
linear equations using the method of inverses.
Covering solving simultaneous
linear equations using elimination and substitution methods.
Objectives: To develop previous skills of solving
linear equations using addition, subtraction, multiplication and division.
They will practice solving systems of
linear equations using substitution.
Section A - Solving x + a = b, x-a = b, a-x = b Section B - Solving ax = b Section C - Solving x / a = b and a / x = b Section D - Solving ax + b = c, ax - b = c, a-bx = c Section E - Solving x / a + b = c, x / a-b = c, a - x / b = c, a - b / x = c Section F - Solving (ax + b) / c =d, (ax - b) / c =d, (a-bx) / c =d Section G - Solving a (bx + c) =d, a (bx - c) =d, a (b - cx) =d Section H - Solving ax + b = cx + d, ax + b = c - dx Section I - Solving a (bx + c) = dx + e, a (bx + c) =d - ex Section J - Solving (ax + b) / c = dx + e, (ax - b) / c = dx + e, (a-bx) / c =d - ex Section K - Mixed exercise The second resource gives your students practice of solving
linear equations using a graph.
An introductory worksheet on solving
linear equations using the method of inverses.
An introduction to solving
linear equations using balancing scales and money, as well as comparing lengths towards the end of the presentation.
Twelve rounds include practice or review solving systems of
linear equations using the substitution method.
Eight stations include practice or review solving one - step
linear equations using inverse operations.
Twelve rounds provide practice or review solving systems of
linear equations using the graphing method.
Two placemat activities include practice solving systems of
linear equations using the substitution method and using the linear combinations / elimination method With a partner, students solve all four equations on the placemat.
Eight stations include practice or review solving multi-step
linear equations using inverse operations.
Six rounds include practice solving systems of
linear equations using the substitution method.
Twelve rounds include practice or review solving systems of
linear equations using the graphing method, the substitution method and the linear combinations / elimination method.
Not exact matches
This allows the algorithm to
use linear equations, which are faster to solve, so it can test multiple routes at once.
That is, these costs are complexly unique lookup tables, not continuous
equations, which means that highway and other
linear models can not be
used rigorously (although people do try to
use them).
The
equation they
use assumes a
linear correlation between the mutation rate on the autosomes, and the mutation rate on the Y chromosome.
For example, if the ratio of red / green fluorescence falls within the
linear window for the theoretical timer shown in Figure 1B, you can
use the
equation fit to this
linear region to solve for total expression time.
Some online dating sites offering compatibility matching methods
use the word similarity as: «a proprietary Dyadic Adjustment Scale», others mean: «a proprietary multivariate
linear regression
equation», some say a mix of similarity and complementarity meaning: «a proprietary multivariate logistic regression
equation», still others mix similarity and complementarity meaning: «a proprietary
equation to calculate «compatibility» between prospective mates!»
Students learn how to solve simultaneous
equations where one is
linear and the other that of a circle
USING ALGEBRA.
Pupils solve
linear equations, which are then
used to decode some further maths questions.
An introductory worksheet to solve a pair of simultaneous
equations where one one is
linear and one non-
linear using graphs.
Six rounds include practice solving two - step
linear equations by inverse operations
using addition, subtraction, multiplication, division and fractions.
This FREE placemat activity provides practice or review solving two - step
linear equations by inverse operations
using addition, subtraction, multiplication, division and fractions.
These are 2 different worksheets that can be
used to practise / revise the most common types of
linear equations that students are expected to be able to solve at GCSE level.
In this lesson, learners are able to: 1) solve 2 simultaneous
equations in 2 variables (
linear /
linear or
linear / quadratic) algebraically; 2) find approximate solutions
using a graph 3) translate simple situations or procedures into algebraic expressions or formulae; derive an
equation (or 2 simultaneous
equations), Lesson can be
used as whole class teaching by teachers and at home by learners.
If you know that
Linear Equations are tested the most often or weighted more in the state test, then use PBL to ensure that students walk away not only knowing linear equations in and out, but being able to think critically with in and make relevant con
Equations are tested the most often or weighted more in the state test, then
use PBL to ensure that students walk away not only knowing
linear equations in and out, but being able to think critically with in and make relevant con
equations in and out, but being able to think critically with in and make relevant connections.
The topics included are: Simultaneous
equations Trigonometry in right - angled triangles Ratio Pythagoras Area Conversions Indices Change the subject of the formula Compound interest
Equation of a straight line Y = mx + c Unit conversions Exchange Rates Solving
linear equations Surface area Factorising with one bracket Speed / distance / time Expand and simplify double brackets Vectors Circumference Volume of cylinder Solving quadratic
equations by factorising Calculators should be
used.
Pupils should be taught to: •
use simple formulae • generate and describe
linear number sequences • express missing number problems algebraically • find pairs of numbers that satisfy an
equation with two unknowns • enumerate possibilities of combinations of two variables.
Linear Equations and System of Equations: Cost of College Mini-Project uses linear equations and systems of equations to examine the cost of college and to compare different
Equations and System of
Equations: Cost of College Mini-Project uses linear equations and systems of equations to examine the cost of college and to compare different
Equations: Cost of College Mini-Project
uses linear equations and systems of equations to examine the cost of college and to compare different
equations and systems of
equations to examine the cost of college and to compare different
equations to examine the cost of college and to compare different colleges.
Students solve
linear equations and
use their answers to find a hidden fact.
(Australian Curriculum) NSW MA4 - 10NA
uses algebraic techniques to solve simple
linear and quadratic
equations
So, in your context of a sports hall, obviously shape is one that you have identified and
used, but others that quickly come to mind would be dimension and measurement esp for different activities that can be played indoors - the dimensions of different playing surfaces / areas etc; construction design (more shape and space incl scale drawings), costs of construction (lots of maths including rates which could incorporate
linear equations with fixed and variable costs); the rules and scoring of different indoor games played (basketball is a good example with different points for different shots); and probably more.
Linear Graphs - the «cover up» method (GCSE)
Linear Graphs - the cover up method interactive PowerPoint the cover up method x and y axes
using the facts
using cover up 8 examples 4 questions
using cover up to: draw
linear graphs solve simultaneous
equations graphically The questions in the PowerPoint are included in pdf format ------------------------------- Solving Linear Equations Interactive, Animated PowerPoint and worksheet (GCSE) Linear Equations Interactive, Animated PowerPoint Balancing equations change side, change sign The explanations are followed by interactive questions, including answers and full solutions The questions and answers are also in pdf format (2 pages)------------------------------ Simplifying Surds Animated PowerPoint (GCSE) GCSE surds animated PowerPoint Simplifying surds What i
equations graphically The questions in the PowerPoint are included in pdf format ------------------------------- Solving
Linear Equations Interactive, Animated PowerPoint and worksheet (GCSE) Linear Equations Interactive, Animated PowerPoint Balancing equations change side, change sign The explanations are followed by interactive questions, including answers and full solutions The questions and answers are also in pdf format (2 pages)------------------------------ Simplifying Surds Animated PowerPoint (GCSE) GCSE surds animated PowerPoint Simplifying surds What i
Equations Interactive, Animated PowerPoint and worksheet (GCSE)
Linear Equations Interactive, Animated PowerPoint Balancing equations change side, change sign The explanations are followed by interactive questions, including answers and full solutions The questions and answers are also in pdf format (2 pages)------------------------------ Simplifying Surds Animated PowerPoint (GCSE) GCSE surds animated PowerPoint Simplifying surds What i
Equations Interactive, Animated PowerPoint Balancing
equations change side, change sign The explanations are followed by interactive questions, including answers and full solutions The questions and answers are also in pdf format (2 pages)------------------------------ Simplifying Surds Animated PowerPoint (GCSE) GCSE surds animated PowerPoint Simplifying surds What i
equations change side, change sign The explanations are followed by interactive questions, including answers and full solutions The questions and answers are also in pdf format (2 pages)------------------------------ Simplifying Surds Animated PowerPoint (GCSE) GCSE surds animated PowerPoint Simplifying surds What is a surd?
Use graphs to find approximate roots of quadratic
equations and the approximate solution of two
linear simultaneous
equations.
(Australian Curriculum) NSW MA4 - 10NA
uses algebraic techniques to solve
linear and quadratic
equations
The questions include solving simultaneous
equations (both
equations linear) and some applied contexts, where students are asked to model real life
using algebraic terms and
equations.
I hope this helps explain the process - and maybe others could suggest other ways to cover
linear equations or graphing straight lines - I certainly
used to
use sport scores (Australian Rules football has a nice scoring system that
uses the formula P = 6g + b) and contexts where there were fixed and variable charges such as taxi fares and work contexts where there are fixed and variable rates of payments.
A presentation that shows students how to solve simultaneous
equations using a graphical technique involving
linear, quadratic and cubic
equations.
The 12 included topics are: Solving
linear equations x's on both sides, fractions with negative fractional powers, Pythagoras» theorem, finding area of a triangle (
using 1/2 absinC), median of a box plot, HCF, Percentage loss, standard form, area of a sector, circle theorems, mean of grouped data and range from stem and leaf diagram.
Full lesson on Promethean software, for setting up and solving simple
linear equations, including: - differentiated learning objectives - key words - slides containing examples for
use when teaching the content - differentiated questioning
While one student is practicing writing an
equation, another can review multi-step
linear equations Included in this ready to
use set of cards: - Teacher directions for multiple ways to
use - 60 +
equation cards and 60 + matching solution cards - A student answer sheet for each concept - A complete answer key for each set of cards This purchase is for one teacher only.
Thus, the game can be
used to motivate and provide drill in solving
linear equations in one variable.
B Solve
linear equations with rational number coefficients, including
equations whose solutions require expanding expressions
using the distributive property and collecting like terms.
Three worksheets on solving
linear equations, and quadratic
equations by factorising and
using the quadratic formula.
Students solve 1 and 2 - step
linear equations, then
use the answers to colour their worksheets based on the colour key.
Students are guided through examples of how to solve
linear equations that require expanding expressions
using the distributive property and collecting like terms.
Students apply what they learned by
using the distributive property to simplify expressions and solve
linear equations in one variable.
PowerPoint and worksheet for lesson on students
using algebraic methods to solve
linear equations.
b ONTARIO CURRICULUM (CANADA) ◾ MPM2D, Analytic Geometry Strand AG1.1 Solve systems of two
linear equations involving two variables,
using the algebraic method of substitution or elimination ◾ MFM2P Modeling
Linear Relations Strand MLR3.1 determine graphically the point of intersection of two
linear relations MLR3.2 solve systems of two
linear equations involving two variables with integral coefficients,
using the algebraic method of substitution or elimination Thanks for checking this out!