Maths-
General
Easy
Question
Find the perimeter of the rectangle.
![](data:image/png;base64,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)
The correct answer is: • The perimeter of a rectangle is the measure of the sum of its all sides. A rectangle has four sides in total.
- We have been given a figure of rectangle in the question and also the two sides of it.
- we have to find the perimeter of the rectangle.
Step 1 of 1:
We have given a rectangle with length
and breadth
.
Now the perimeter of any rectangle is ![2 left parenthesis l plus b right parenthesis](data:image/png;base64,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)
So,
![table attributes columnalign right left right left right left right left right left right left columnspacing 0em 2em 0em 2em 0em 2em 0em 2em 0em 2em 0em end attributes row cell equals 2 left parenthesis l plus b right parenthesis end cell row cell equals 2 left parenthesis 3 x minus 1 plus x plus 1 right parenthesis end cell row cell equals 2 left parenthesis 4 x right parenthesis end cell row cell equals 8 x end cell end table](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAJQAAABWCAYAAAApHL9rAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAxkfqSpAAABTZJREFUeNrtnVGEFlEUx69kJSuSJPsQWUkPK3pIksRKsrKWfVg9ZEWSJL30kCSJtZKklyQ9JEuykmRZWUmyJKuHZFk99JBeekiSFV/nmPNpmr13Zu7MnZl7Z/8/zsP3zZ3Ze+c7e++Ze+9/jlLAZ86QTXhUnwmpEwiQAbK3HtbrjdQNeMB+sidkP8iWyRbIjqf8cLsNx36Rramgfnmuu4fsNX5KP3hFNkbWK593ieOMJcrtlu919JN9qKBuNtd9LY4FPGSb5oecJDtrKD9MNpXz2h2Lethc95xnsR1I8DvxeYbsgKHsFbKLFTgUX/cS2VWyr1KnObKtmrL7yF7iZ3NHJ4flZZ9meOMYq8dQ/rH0Jq4diq+7JM66UWKpm4Zeq0fqCDxjHdm8BOtx/qScs0jWV4FDLUpMF2dDiuMs4+fzC+4FnpId1hwzOdQaeRJz3XOarrsODhXGkLddnKnfcNw05O2VuMamnnkwXdcUK2HI84idZPfI1qeUmdUMg0qmFx5U4FCm614gu4yg3F+2SPC7NqOcadrgNtmpChyKrzuu6YU+GJ7yzkodQcM8lx4qC9PE5jTZ0QocalqC8kH53CffjRvKY2IzgNgrCa/jJdfMvkug7JpvZMfEqfiBYCFlagJLL4GCxWHgnNPKryWOScsYDgAAAAAAAAAAAACA1uObBg2sJBhdnq/LDGAljS29lNGgHSJ7oaJdhLxZnhctb5Ft8uSm7lDRPqGFFjpMVtsaWxwuo0Hj3YMj6v9di1xuxpOb/lBFa1qdFjpUnrZ5s33FVoOWxLdtp52azqm7jlnneaXLs9GgxeF92J803580NO6aHAvZoVy0rQqHKrUFuEkNGsPbZscljjLtVnwv5bpw+Tst6aHKtq0Kh/JCpGCrQUs67fmUax9RkSiRGVT1baCvw6HKtq1TUdsalVEV0aDFzx0WZzyYUm5Wji/keBp01et2cpYp+7d8bNtymf/CJjRoSXrFqUycl0bWOUdSV1Bepm2tGvLKaNDyBPRdunNeNzXTEqE7VNm2eReUF6WsBi3JgATmuh7wmTgt92LvVH0ToFU7lIu2VeFQjejyymjQeFJ0VJyRdfc8c/6Z7ESi3GYVzajHb/KQiibnQncoV22rwqEamdgso0E7IA75W/17T9GQZhxnMaLuTSRT8nRUZ9tc4nPbgtDlYXE4HILR5fmmQQP6eBe6PAAAAAAAAAAAAAAAgHOq1DciX94qo44lLLwSMXBc5dhjeIG97EI2XtoaOC5y7Ck5/6NyszMCr5VuGUX0jXdVJL1y4VDIl9dCbPSNPGx2t+yaHMpGA4jUHB7QlL6xm2JjW4ZDMXk1gEge1CJs9Y0TiaEwzaFsNIBIb9YCbPWNA5qeLKsnzKsBhEMFPuQV0TfOa8pn/Z08GkAMeYFTVN9o68B5NYAIygPGtb6xk9ID5tUAIl9ewJTNsZfHoWw1gJjYbGnsleStyl5n62jiIRsNIJZeVhFYHAbOqVLfCF0eAAAAAAAAAAAAAAAAAADACniLym2ynyoSO7DAoQ+3BRTlPtl1Fe2x4t0GvPY3j9sCipKUYPG74LFHHBSGh7rehEN90ZRrMhchqJkyogeOn87FPvMe8RuGsk3lIgQBMSBDHBu/O+GrMquOm8pFCAKBFcSPyLaqf7Ir3ta7pMw7MW3y9YFVNuRNGxyHEzTNGc5pIhchCPQJL+tYU7kIQSDwO6J06uNdEkvFaTIXIQiEEXGqQzJd0M1HyDHU6Vi5pnMRgoAYlemAZRnm+ElvOHa8cL6+v7L9/IkKDTDLAAACU3RFWHRNYXRoTUwAPG1hdGggeG1sbnM9Imh0dHA6Ly93d3cudzMub3JnLzE5OTgvTWF0aC9NYXRoTUwiPjxtdGFibGUgY29sdW1uYWxpZ249InJpZ2h0IGxlZnQgcmlnaHQgbGVmdCByaWdodCBsZWZ0IHJpZ2h0IGxlZnQgcmlnaHQgbGVmdCByaWdodCBsZWZ0IiBjb2x1bW5zcGFjaW5nPSIwZW0gMmVtIDBlbSAyZW0gMGVtIDJlbSAwZW0gMmVtIDBlbSAyZW0gMGVtIj48bXRyPjxtdGQ+PG1vPj08L21vPjxtbj4yPC9tbj48bW8+KDwvbW8+PG1pPmw8L21pPjxtbz4rPC9tbz48bWk+YjwvbWk+PG1vPik8L21vPjwvbXRkPjwvbXRyPjxtdHI+PG10ZD48bW8+PTwvbW8+PG1uPjI8L21uPjxtbz4oPC9tbz48bW4+MzwvbW4+PG1pPng8L21pPjxtbz4mI3gyMjEyOzwvbW8+PG1uPjE8L21uPjxtbz4rPC9tbz48bWk+eDwvbWk+PG1vPis8L21vPjxtbj4xPC9tbj48bW8+KTwvbW8+PC9tdGQ+PC9tdHI+PG10cj48bXRkPjxtbz49PC9tbz48bW4+MjwvbW4+PG1vPig8L21vPjxtbj40PC9tbj48bWk+eDwvbWk+PG1vPik8L21vPjwvbXRkPjwvbXRyPjxtdHI+PG10ZD48bW8+PTwvbW8+PG1uPjg8L21uPjxtaT54PC9taT48L210ZD48L210cj48L210YWJsZT48L21hdGg+o5lrxwAAAABJRU5ErkJggg==)
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Maths-
Simplify. Write the answer in the standard form.
![3 x plus 2 x squared minus 4 x plus 3 x squared minus 5 x](data:image/png;base64,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)
Simplify. Write the answer in the standard form.
![3 x plus 2 x squared minus 4 x plus 3 x squared minus 5 x](data:image/png;base64,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)
Maths-General
Maths-
Polynomial A has degree 2; polynomial B has degree 4. What can you determine about the name and the degree of the sum of the polynomials if polynomial A is a binomial and polynomial B is a monomial?
Polynomial A has degree 2; polynomial B has degree 4. What can you determine about the name and the degree of the sum of the polynomials if polynomial A is a binomial and polynomial B is a monomial?
Maths-General
Maths-
Describe the given statement as always, sometimes or never true.
A cubic monomial has a degree of 3.
Describe the given statement as always, sometimes or never true.
A cubic monomial has a degree of 3.
Maths-General
Maths-
Describe the given statement as always, sometimes or never true.
A trinomial has a degree of 2.
Describe the given statement as always, sometimes or never true.
A trinomial has a degree of 2.
Maths-General
Maths-
Describe the given statement as always, sometimes or never true.
A linear binomial has a degree of 0.
Describe the given statement as always, sometimes or never true.
A linear binomial has a degree of 0.
Maths-General
Maths-
What is the missing term in the equation?
![open parentheses a squared plus ? plus 1 close parentheses minus left parenthesis ? plus a plus ? right parenthesis equals 4 a squared minus 2 a plus 7](data:image/png;base64,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)
What is the missing term in the equation?
![open parentheses a squared plus ? plus 1 close parentheses minus left parenthesis ? plus a plus ? right parenthesis equals 4 a squared minus 2 a plus 7](data:image/png;base64,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)
Maths-General
Maths-
What is the missing term in the equation?
![left parenthesis a plus 7 right parenthesis plus left parenthesis 2 x minus 6 right parenthesis equals negative 4 x plus 1](data:image/png;base64,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)
What is the missing term in the equation?
![left parenthesis a plus 7 right parenthesis plus left parenthesis 2 x minus 6 right parenthesis equals negative 4 x plus 1](data:image/png;base64,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)
Maths-General
Maths-
Find the degree of the given monomial.
I) ![x over 4](data:image/png;base64,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)
II) ![negative 7 x y](data:image/png;base64,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)
Find the degree of the given monomial.
I) ![x over 4](data:image/png;base64,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)
II) ![negative 7 x y](data:image/png;base64,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)
Maths-General
Maths-
Divide the remaining figure into two rectangles. What are the dimensions of each rectangle?
![](data:image/png;base64,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)
Divide the remaining figure into two rectangles. What are the dimensions of each rectangle?
![](data:image/png;base64,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)
Maths-General
Maths-
What is the product of (3𝑥2 − 4𝑦)(3𝑥2 + 4𝑦)?
This question can be easily solved by using the formula
(a + b)(a - b) = a2 - b2
What is the product of (3𝑥2 − 4𝑦)(3𝑥2 + 4𝑦)?
Maths-General
This question can be easily solved by using the formula
(a + b)(a - b) = a2 - b2
Maths-
Write the product in the standard form. (
𝑥 +
)2
This question can be easily solved by using the formula
(a + b)2 = a2 + 2ab + b2
Write the product in the standard form. (
𝑥 +
)2
Maths-General
This question can be easily solved by using the formula
(a + b)2 = a2 + 2ab + b2
Maths-
Write the product in the standard form. (0.4𝑥 + 1.2)2
This question can be easily solved by using the formula
(a + b)2 = a2 + 2ab + b2
Write the product in the standard form. (0.4𝑥 + 1.2)2
Maths-General
This question can be easily solved by using the formula
(a + b)2 = a2 + 2ab + b2
Maths-
What is the area of the shaded region?
![](data:image/png;base64,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)
What is the area of the shaded region?
![](data:image/png;base64,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)
Maths-General
Maths-
What is the total area of four white triangles if 𝑥 = 12 𝑐𝑚?
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)
What is the total area of four white triangles if 𝑥 = 12 𝑐𝑚?
![](data:image/png;base64,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)
Maths-General