Question
How many syllables are there in the word 'Umbrella'
- 1
- 2
- 3
- 4
The correct answer is: 3
Correct answer c) 3
Explanation - Syllables are small group of words that we hear in each word. Each syllable must have a vowel sound
Related Questions to study
A ladder 20 m long rests against a vertical wall. If the foot of the ladder is 12 m away from the base of the wall, the height of the point on the wall where the top of the ladder reaches is ……..
A ladder 20 m long rests against a vertical wall. If the foot of the ladder is 12 m away from the base of the wall, the height of the point on the wall where the top of the ladder reaches is ……..
Choose the correct synonym, for ‘against’
Choose the correct synonym, for ‘against’
In a computer catalogue, a computer monitor is listed as being 27 cm. This distance is the diagonal distance across the screen. If the screen measures 15 cm in height, what is the actual width of the screen to the nearest inch?
In a computer catalogue, a computer monitor is listed as being 27 cm. This distance is the diagonal distance across the screen. If the screen measures 15 cm in height, what is the actual width of the screen to the nearest inch?
Read the sentence and choose the verb that best completes the sentences.
The teachers the papers.
Read the sentence and choose the verb that best completes the sentences.
The teachers the papers.
Which of the following Compound inequalities have the solution x < 3, select all that apply.
You can also follow these steps to solve the compound inequality with the equation for example: 3x + 5 < 6:
Subtract 5 from both sides.
3x + 5 - 5 < 6 - 5
Simplify and subtract the numbers.
And we get, 3 x < 1
Divide both sides by the same factor.
3x/3 < 1/3
Cancel terms that are in both the numerator and denominator.
and the solution is x < 1/3.
Which of the following Compound inequalities have the solution x < 3, select all that apply.
You can also follow these steps to solve the compound inequality with the equation for example: 3x + 5 < 6:
Subtract 5 from both sides.
3x + 5 - 5 < 6 - 5
Simplify and subtract the numbers.
And we get, 3 x < 1
Divide both sides by the same factor.
3x/3 < 1/3
Cancel terms that are in both the numerator and denominator.
and the solution is x < 1/3.
If a man is 6 ft. tall and he casts a shadow that is 3 ft. long, what is the distance from the top of the man's head to the end of his shadow?
If a man is 6 ft. tall and he casts a shadow that is 3 ft. long, what is the distance from the top of the man's head to the end of his shadow?
Lucy plans to spend between $50 and $ 65, inclusive on packages of charms. If she buy 5 packages of beads at $4.95 each, how many packages of charms at $6.55 can lucy buy while staying within her budget?
When two simple inequalities are combined, the result is a compound inequality. For example, a sentence with two inequality statements connected by the words "or" or "and" is a compound inequality. The conjunction "and" denotes the simultaneous truth of both statements in the compound sentence. So it is when the solution sets for the various statements cross over or intersect. E.g., for "AND": Solve the statement where x: 3 x + 2 < 14 and 2 x – 5 > –11. The solution set is
{ x| x > –3 and x < 4}. All the numbers present to the left of 4 are denoted by x < 4, and the numbers to the right of -3 are represented by x > -3. The intersection of these two graphs is comprised of all integers between -3 and 4.
Lucy plans to spend between $50 and $ 65, inclusive on packages of charms. If she buy 5 packages of beads at $4.95 each, how many packages of charms at $6.55 can lucy buy while staying within her budget?
When two simple inequalities are combined, the result is a compound inequality. For example, a sentence with two inequality statements connected by the words "or" or "and" is a compound inequality. The conjunction "and" denotes the simultaneous truth of both statements in the compound sentence. So it is when the solution sets for the various statements cross over or intersect. E.g., for "AND": Solve the statement where x: 3 x + 2 < 14 and 2 x – 5 > –11. The solution set is
{ x| x > –3 and x < 4}. All the numbers present to the left of 4 are denoted by x < 4, and the numbers to the right of -3 are represented by x > -3. The intersection of these two graphs is comprised of all integers between -3 and 4.
Solve 3(2x-5) >15 and 4(2x-1) >10
Solve 3(2x-5) >15 and 4(2x-1) >10
A 2.5m long ladder leans against the wall of a building. The base of the ladder is 1.5m away from the wall. What is the height of the wall?
A 2.5m long ladder leans against the wall of a building. The base of the ladder is 1.5m away from the wall. What is the height of the wall?
Solve 0.5x-5 > -3 or +4 < 3 , graph the solution
Solve 0.5x-5 > -3 or +4 < 3 , graph the solution
Solve x-6 ≤ 18 and 3-2x ≥ 11, and graph the solution.
Solve x-6 ≤ 18 and 3-2x ≥ 11, and graph the solution.
Write a compound inequality for each graph:
Write a compound inequality for each graph:
Solve 2x-3 > 5 or 3x-1 < 8 , graph the solution.
A compound inequality is a clause that consists of two inequality statements connected by the words "or" or "and." The conjunction "and" indicates that the compound sentence's two statements are true simultaneously. It is the point at which the solution sets for the various statements overlap or intersect.
¶A type of inequality with two or more parts is a compound inequality. These components may be "or" or "and" statements. If your inequality reads, "x is greater than 5 and less than 10," for instance, x could be any number between 5 and 10.
Solve 2x-3 > 5 or 3x-1 < 8 , graph the solution.
A compound inequality is a clause that consists of two inequality statements connected by the words "or" or "and." The conjunction "and" indicates that the compound sentence's two statements are true simultaneously. It is the point at which the solution sets for the various statements overlap or intersect.
¶A type of inequality with two or more parts is a compound inequality. These components may be "or" or "and" statements. If your inequality reads, "x is greater than 5 and less than 10," for instance, x could be any number between 5 and 10.
