After Reading and Writing & Language, you will take Math as your third and fourth sections on the SAT. The first portion, which lasts for 25 minutes, is calculator-free. You'll go to the next session, which is 55 minutes long, after a brief break. You're allowed to use your calculator during this lengthy part.

Multiple-choice questions with four possible answers will be the first thing you see in both sections. After that, you will be required to provide some student-written comments, sometimes known as "grid-ins." Some of this grid-ins will be related to one another in the calculator section as part of an Extended Thinking question.

The two SAT math portions are broken down into duration, questions, and question type.

Portion | Number of Questions | Duration |
---|---|---|

Without Calculator | Multiple Choice Questions-15 Grid-ins Question-5 | 25 minutes |

With Calculator | Multiple Choice Questions-30 Grid-ins Question-8 ( An Extended Thinking Question is included) | 55 minutes |

Total | 58 Questions | 80 minutes |

You can only use a calculator in the longer Math section. Naturally, memorizing this material would be preferable to wasting time looking up the formulas in your test booklet. Because geometry questions only make up 10% of the math section's questions, this topic isn't truly all that crucial. Now that I've mentioned that, what mathematical abilities and ideas are most common in the section?

Although the math section doesn't focus much on geometry questions, it does on algebra, equation solving, and data interpretation from tables and graphs. Heart of Algebra, Passport to Advanced Math, and the College Board's Problem Solving and Data Analysis are the three main categories of questions (they gave up on the creative naming once they reached the third category).

These three subcategories account for 90% of the SAT math problems. The remaining 10% are just referred to as Additional Topics, and they mainly cover complex numbers, geometry, and basic trigonometry.

Let's examine each of these groups in more detail by looking over the SAT math topics and skills they assess. From each, you'll see three samples of legitimate practice questions.

Linear equations, inequalities, functions, and graphs are the subject matter of SAT math problems in the Heart of Algebra category. The official College Board themes are included here, along with a list of the preparation chores you'll need to complete these questions and some sample problems.

- Linear inequalities and equations are solved (in these expressions, x is a constant or the product of a constant)
- Using linear functions to make sense.
- Equation and linear inequality word problems.
- Equations with a linear graph.
- Word issues with linear functions.
- Multiple linear inequality systems issue with words.
- Resolving several linear equations

- Follow a few steps to get the value of a variable or to simplify an expression or equation.
- In two-variable functions or systems of inequality, identify the variable (usually x and y).
- To determine whether a certain point is a part of a solution set or what value would make an expression not have a solution, perform some research.
- Pick an algebraic equation that a graph can use to represent it, or vice versa: pick an equation that can be used to describe a graph.
- Describe how a graph may change if the equation behind it is modified in a particular way.

Passport to Advanced Math questions deals with nonlinear expressions or expressions in which a variable is increased to an exponent other than zero or one, in contrast to Heart of Algebra questions, which are centered on linear equations. Work with word problems, exponential expressions, and quadratic equations to answer these questions.

Continue reading for a complete list of topics included in Passport to Advanced Math, as well as an overview of the assignments and three sample SAT questions.

- Quadratic equations to solve
- Nonlinear expression interpretation
- Exponential and quadratic word puzzles
- Radicals and proponents of reason
- Operations using polynomials and rational expressions
- Diagrams and factors from polynomials
- Diagrams of nonlinear equations
- Quadratic and linear systems
- Explicit expression structure
- Separating amounts
- Functions

- Factor equations to get their solutions, or use alternative techniques to rewrite the equations.
- Simplify your results by adding, subtracting, multiplying, or dividing two rational expressions or two polynomial expressions.
- Choose a nonlinear equation or a graph that the corresponding equation represents.
- From a graph's description, deduce the equation of the curve.
- Determine how a graph would alter if its equation were to change.

Questions from this third and last major area need you to work with rates, ratios, percentages, and information from graphs and tables. For the official themes, a list of the assignments, and three example questions, continue reading.

- Rates, proportions, and ratios
- Percents \sUnits
- Table data
- Scatterplots
- Important aspects of graphs
- Exponential and linear growth
- Data conclusions
- Center, spread, and distribution shapes
- Data gathering and findings

- Calculate ratios, rates, percentages, unit rates, or densities by finding solutions to multi-step problems.
- To solve a multistep problem, use the ratio, rate, percentage, unit rate, or density that is given.
- Pick an equation that a scatterplot best fits.
- To summarize information, such as probabilities, use tables.
- Populations can be estimated using sample data.
- Calculate mean, median, mode, range, and/or standard deviation using statistics.
- Analyze graphs, tables, and text summaries.
- Analyze the precision of a data collection technique.

90% of your questions will fall under the Heart of Algebra, Passport to Advanced Math, or Problem Solving and Data Analysis categories, while the remaining 10% will only be labeled as Additional Topics. These themes include difficult numerical issues, geometry, and trigonometry.

- Volume word problems
- Rectilinear word puzzles
- Similarity and consistency
- Triangles to the right
- Triangle functions, arc lengths, and angles
- Theorems of circles
- Equations in a circle
- Intricate numbers

- Determine a shape's volume.
- To calculate side length or angle measurement, use triangle characteristics.
- Calculate the area and length of an arc using the characteristics of circles.
- Utilize sine, cosine, and tangent to solve problems.

To be strongest in a Math subject and get the highest possible score, you should approach the math portion strategically through info@masterclassspace.com.