Answer: the worth of the essay portion is, scored from 200 to 800 points. (including the multi-choice answer questions)
Explanation: I hope that helps you understand it more!<3
Answer:
The SAT writing section is scored from 200 to 800 points, based on the combined results of the essay and multiple-choice questions. According to the College Board, the essay portion of the writing section counts for about 30 percent of the total writing score.
Explanation:
Refer to College Board's "Getting Ready for the SAT" booklet for the official conversion chart showing the relationship between the essay score and multiple-choice writing section score. For instance, an essay score of eight and a multiple-choice score of 27 yields a composite writing score of 520 points. The difference of just one point on the essay can bring the writing section composite score up or down by 10 to 20 points, so writing a good essay can really help bump up your overall SAT score
Suppose that 80% of books are classified as fiction. Two books are chosen at random. What is the probability that both books ara fiction?
Answer:
64% or 16/25
Explanation:
To calculate probability, we first find the fraction for the number of books that are fiction.
[tex]80= \frac{4}{5}[/tex]
To find out what the probability of choosing a fiction book twice, we multiply 4/5 with 4/5 to get our probability if we selected a book twice.
[tex]\frac{4}{5} *\frac{4}{5} = \frac{16}{25} \\0.64[/tex]
The probability of choosing two fiction books is a 16/25, or 64% chance.
c. What is the probability that the child will have red hair color?
0. LIOC PODIVIU VALOITUS.
O A. red / red, red / blond, and blond / blond
OB. red/blond and blond/red
C. red / red, red / blond, blond/red, and blond / blond
OD. red/ red and blond / blond
5. The probability that a child of these parents will have the blond / blond genotype is
Round to two decimal places as needed.)
Answer:
The probability that the child will have red hair color is 0.75.
Thus, the probability that a child of these parents will have the blond / blond genotype is 0.25.
Explanation:
It is provided that each parent has the genotype red / blond which consists of the pair of alleles that determine hair color, and each parent contributes one of those alleles to a child.
The possible outcomes for the hair color of the child are:
S = {R/R, R B, B/R and B/B}
There are four possible outcomes.
Compute the probability that the child will have red hair color as follows:
[tex]P(\text{R})=P(\text{R/R})+P(\text{R/B})+P(\text{B/R})[/tex]
[tex]=\frac{1}{4}+\frac{1}{4}+\frac{1}{4}\\\\=\frac{3}{4}\\\\=0.75[/tex]
Thus, the probability that the child will have red hair color is 0.75.
Compute the probability that a child of these parents will have the blond / blond genotype as follows:
[tex]P(\text{B/B})=\frac{1}{4}=0.25[/tex]
Thus, the probability that a child of these parents will have the blond / blond genotype is 0.25.
Answer:
The probability that the child will have red hair color is 0.75.
Thus, the probability that a child of these parents will have the blond / blond genotype is 0.25.
Explanation:
It is provided that each parent has the genotype red / blond which consists of the pair of alleles that determine hair color, and each parent contributes one of those alleles to a child.
The possible outcomes for the hair color of the child are:
S = {R/R, R B, B/R and B/B}
There are four possible outcomes.
Compute the probability that the child will have red hair color as follows:
Thus, the probability that the child will have red hair color is 0.75.
Compute the probability that a child of these parents will have the blond / blond genotype as follows:
Thus, the probability that a child of these parents will have the blond / blond genotype is 0.25.
A computer can be classified as either cutting-edge or ancient. Suppose that 98% of computers are classified as ancient. Two computers are choosen at random. What is the probability that both computets are ancient?
Answer:
The probability of picking two ancient computers is 96.04% .
Find the volume, in cubic inches, of the composite solid below, which consists of a 4 -inch square solid rectangular bar that is 16 inches in length. The bar has a 2 -inch diameter cylinder hole cut out of the center of the bar from the top of the bar through the entire length of the bar. Use 3.14 to find the volume. Enter only the number.
Answer:
10 in³
Explanation:
given:
square box = 4 in², length = 16 in
bar diameter = 2 in, length = 16 in
box volume (in solid) = 4 in² * 16 in = 64 in³
bar volume = pi * d² / 4 = 3.14 * 2² / 4 * 16 in = 50.24 in³
Volume of slotted box = 64 - 50 = 10 in³