PROB SOLV MATH ACCESS
11th Edition
ISBN: 2818440052330
Author: BILLSTEIN
Publisher: PEARSON
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Textbook Question
Chapter 7, Problem 1NT
In a set of base-ten blocks, let 1 flat represents 1 unit.
a. What does 1 long represents?
b. What does 1 cube represents?
c. Represent 1.23 using the blocks with these representations.
Expert Solution
To determine
(a)
To find:
In a set of base-ten block, 1 long represents.
Answer to Problem 1NT
Solution:
1 long represents
Explanation of Solution
Given:
In a set of base-ten blocks, 1 flat represents 1 unit.
Approach:
Write decimal in form of tenths and hundredths.
Calculation:
There are 10 block/ long in 1 flat.
Hence, 1 long/ block represents 0.1 flat.
Expert Solution
To determine
(b)
To find:
In a set of base-ten block, 1 cube represents.
Answer to Problem 1NT
Solution:
1 cube represents
Explanation of Solution
Given:
In a set of base-ten blocks, 1 flat represents 1 unit.
Approach:
Write decimal in form of tenths and hundredths.
Calculation:
There are again 10 cubes in 1 long.
By equation (1)
Hence, 1 cube represents 0.01 flat.
Expert Solution
To determine
(c)
To represent:
The number 1.23 using blocks.
Answer to Problem 1NT
Solution:
The representation of 1.23 is
Explanation of Solution
Given:
In a set of base-ten blocks, 1 flat represents 1 unit.
Approach:
Write decimal in form of tenths and hundredths.
Calculation:
Here
1 long = 0.1 flat
1 cube = 0.01 flat
Here 1 represent 1 flat,
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Chapter 7 Solutions
PROB SOLV MATH ACCESS
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- Question Given the following piecewise function, evaluate lim →1− f(x). Select the correct answer below: ○ 1 ○ 4 -4 The limit does not exist. -2x² - 2x x 1arrow_forwardSolve the linear system of equations attached using Gaussian elimination (not Gauss-Jordan) and back subsitution. Remember that: A matrix is in row echelon form if Any row that consists only of zeros is at the bottom of the matrix. The first non-zero entry in each other row is 1. This entry is called aleading 1. The leading 1 of each row, after the first row, lies to the right of the leading 1 of the previous row.arrow_forwardSolve the linear system of equations attached using Gaussian elimination (not Gauss-Jordan) and back subsitution. Remember that: A matrix is in row echelon form if Any row that consists only of zeros is at the bottom of the matrix. The first non-zero entry in each other row is 1. This entry is called aleading 1. The leading 1 of each row, after the first row, lies to the right of the leading 1 of the previous row.arrow_forward
- Actividades: malemática (Erigonometria) Razones trigonometrica 2025 23 Jures Encuentra las seis razones of trigonométricas, on los siguienter tiringher rectangulies 4 A C =7 b=8cm. * c C=82m a=? * C * B A 4A=- 4 B= C=12cm B 9=7 C A b=6um B a=6cm Sen&c=- AnxB=- Sen&A = Anx = - Bos *A= - cos &c= Zang KA= Tong&c= ctg & A= — ctg &c= Séc & A = - Cosc&A= Secxce csck(= cos & C = - cos & B= Tong & C = — tang & B = d=g&c= cfg &c=— cg & B= sec &C= secxB=- оскв=- =_csCKB = 6=5m AnxA = - AnxB= cos * A= - cos &b= Tmg & A = - Tong & B=- ct₁ A = - C√ B=- cfg & Soc *A= Sec & B=- ACA=- CAC & B=- FORMATarrow_forwardPRIMERA EVALUACIÓN SUMATIVA 10. Determina la medida de los ángulos in- teriores coloreados en cada poligono. ⚫ Octágono regular A 11. Calcula es número de lados qu poligono regular, si la medida quiera de sus ángulos internos • a=156° A= (-2x+80 2 156 180- 360 0 = 24-360 360=24° • a = 162° 1620-180-360 6=18-360 360=19 2=360= 18 12. Calcula las medida ternos del cuadrilá B X+5 x+10 A X+X+ Sx+6 5x=3 x=30 0 лаб • Cuadrilátero 120° 110° • α = 166° 40' 200=180-360 0 = 26-360 360=20 ひ=360 20 18 J 60° ⚫a=169° 42' 51.43" 169.4143180-340 0 = 10.29 54-360 360 10.2857 2=360 10.2857 @Saarrow_forward(4) (8 points) (a) (2 points) Write down a normal vector n for the plane P given by the equation x+2y+z+4=0. (b) (4 points) Find two vectors v, w in the plane P that are not parallel. (c) (2 points) Using your answers to part (b), write down a parametrization r: R² — R3 of the plane P.arrow_forward
- (2) (8 points) Determine normal vectors for the planes given by the equations x-y+2z = 3 and 2x + z = 3. Then determine a parametrization of the intersection line of the two planes.arrow_forward(3) (6 points) (a) (4 points) Find all vectors u in the yz-plane that have magnitude [u also are at a 45° angle with the vector j = (0, 1,0). = 1 and (b) (2 points) Using the vector u from part (a) that is counterclockwise to j, find an equation of the plane through (0,0,0) that has u as its normal.arrow_forward(1) (4 points) Give a parametrization c: R R³ of the line through the points P = (1,0,-1) and Q = (-2, 0, 1).arrow_forward
- 7. Show that for R sufficiently large, the polynomial P(z) in Example 3, Sec. 5, satisfies the inequality |P(z)| R. Suggestion: Observe that there is a positive number R such that the modulus of each quotient in inequality (9), Sec. 5, is less than |an|/n when |z| > R.arrow_forward9. Establish the identity 1- 1+z+z² + 2n+1 ... +z" = 1- z (z1) and then use it to derive Lagrange's trigonometric identity: 1 1+ cos cos 20 +... + cos no = + 2 sin[(2n+1)0/2] 2 sin(0/2) (0 < 0 < 2л). Suggestion: As for the first identity, write S = 1+z+z² +...+z" and consider the difference S - zS. To derive the second identity, write z = eie in the first one.arrow_forward8. Prove that two nonzero complex numbers z₁ and Z2 have the same moduli if and only if there are complex numbers c₁ and c₂ such that Z₁ = c₁C2 and Z2 = c1c2. Suggestion: Note that (i≤ exp (101+0) exp (01-02) and [see Exercise 2(b)] 2 02 Ꮎ - = = exp(i01) exp(101+0) exp (i 01 - 02 ) = exp(102). i 2 2arrow_forward
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