Comparison and Contrast Clues
Sometime you can tell the meaning of an unfamiliar word when it is compared or contrasted to something familiar. Context clues that show comparison include like, as, similar, and in the same way. Contrasts may be signaled by words such as but, although, however, and on the other hand.
Kari’s happy face was luminous, like the rays of the sun.
The clue word like in this sentence tells you that luminous means “shining” or
“giving off light.”
I assumed a rhino would move in a lumbering manner, but it raced across the screen like an attacking army tank.
The clue word but in this sentence suggests that lumbering means “moving in a heavy, slow manner.”
Answer:
Somewhere near the coast.
Explanation:
I think that because she lives near where hurricanes are most active.
<span>B - Reescreva a frase com o sujeito indivíduos, fazendo as devidas alterações. C - Reescreva a frase com o sujeito internauta, fazendo as devidas alterações. D - Reescreva a frase com o sujeito homens e mulheres, fazendo</span>
No poop Sherlock...................
I think that the question you are trying to ask is . . . A college student takes out a $7500 loan from a bank. What will the balance of the loan be after one year(assuming the student has not made any payments yet)
a. if bank charges 3.8% interest each year ?
b. if the bank charger 5.3% interest each year ?
Answer:
(a) $7785
(b) $7897.5
Step-by-step explanation:
Given:
Loan = $7500
We need to find the balance of the loan be after one year(assuming the student has not made any payments yet).
The formula for amount or loan is
A = P( 1 + r)^t .... (1)
where, P is principle, r is rate of interest and t is time in years.
(a) If bank charges 3.8% interest each year.
r = 3.8% = 0.038
Substitute P=7500, r=0.038 and t=1 in equation (1).
A = 7500 (1 + 0.038)^1
A = 7500 (1.038)
A = 7785
Therefore, the balance of the loan be after one year is $7785.
(b) If the bank charger 5.3% interest each year.
r = 5.3% = 0.053
Substitute P=7500, r=0.053 and t=1 in equation (1).
A = 7500 (1 + 0.053)^1
A = 7500 (1.053)
A = 7897.5
Therefore, the balance of the loan be after one year is $7897.5.
