It gives information about the best way to use the book to achieve the highest possible score on the test. This information serves as an introduction to the contents of the prep book along with information about what students should expect when taking the PSAT. To help students make the most of their study time and sharpen their knowledge and test-taking skills, the best PSAT prep books have several key features. Editorial concepts, style, sentence structure, and syntax are also included in this section. Reading comprehension: In the reading test, students demonstrate their understanding of how words are used, how well they can answer questions based on reading passages, and how well they interpret information.ĭefense and clarity of arguments: Students are measured on how well they can form arguments to support their summary of evidence in the writing and language test. Their performance helps provide direction for preparing for the SAT and furthering their education.īasic understanding of math: In addition to evaluating students’ ability to apply math to everyday situations, the math portion of the PSAT determines levels of basic understanding of mathematical concepts, as well as each student’s ability to solve a wide range of problems. What the PSAT measuresĮach portion of the PSAT measures where students rank on various skills. This added educational material prompts students to analyze questions while also honing in on other important subjects that they’ve already encountered in their schooling and that they’ll be studying in more depth in college. Many questions within these three sections focus on other subjects, including history, social studies, and key figures throughout the world. Questions will be centered on a variety of subjects and topics. Writing and language test: This portion focuses on skills students use frequently in the classroom and challenges them to read, locate errors, and make appropriate corrections. It focuses on analysis of the details in the passages rather than memorization. Reading test: This portion consists of passages on a variety of topics and requires students to answer questions with information located in the readings. Problems on the test range from data equations to algebra to advanced math. Math test: Math problems replicate the ways in which students will use mathematics in college, daily life, and career settings. Individual tests in the PSAT include the following: The PSAT includes several test sections based on key knowledge students will need to get into and succeed in college. Students have 2.75 hours to complete the PSAT, which is typically given at their school in October. The best way to think of the PSAT/NMSQT is as preparation for the SAT. The College Board of the United States administers the test to high school sophomores and juniors. The full name of the test, the Preliminary SAT/National Merit Scholarship Qualifying Test, comes from the co-sponsorship of the nonprofit National Merit Scholarship Corporation that awards scholarships to students. The information you will be tested on is too comprehensive and your score is too important not to take the time to prepare well in advance of test day. Substituting we have: $s + 12 = 48$.Don’t cram for the PSAT. Subtracting the first equation from the second: Solving this set of equations is made easier if we divide both sides of the second equation by $10$. We now have a system of two simultaneous equations that we can use to solve for $s$ and $d$: We can combine this information to get the following equation: Renting the dancing room for $d$ minutes cost $20d$. Renting the singing room for s minutes cost $10s$. We also know that the total cost was $\$600$. We know that together the rooms were rented for a total of 48 minutes: Let $s$ be the number of minutes the singing room was rented, and let $d$ be the number of minutes the dancing room was rented. Something very helpful to realize in this question is that even though $b$ technically must be greater than $\frac$ False Using these facts, you can conclude that the correct choice is (A).Īn alternative approach is to find a value of $b$ that can be used to test each of the four answer choices. Similarly, when a fraction (less than 1) is taken to a negative power, the result will be greater than the original fraction. Thus $b$ will be greater than $b^n$ when $n>1$. Use the fact that multiplying a fraction (less than 1) by itself will make the result smaller each time.
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