Question
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,iVBORw0KGgoAAAANSUhEUgAAAL0AAAARCAYAAACICa2lAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAQ3ZOC+gAAApNJREFUeNrtWkFHbVEUPpLkSSRJ3iDyJMkVaZAkkSRvkGhwNUiapUGaN2rSKA2apOEbxJM8SSJJgwaXXGmQRPoHDRrkSpzW0hfXdTp337v3Wuf2zl581Ln77r79fevstfY5BUH6IgReCZeEX4EPr2dKoo6wRMh7KbyeaYuCl8DrmaYYJVx4GdKp5xjhmPCCO/WesEVoTZjXMGGf8Iye8Zow52juDvSgXQrr+I2+93/2WVLPMAZVxzlhhtBQdK2fcJKwSbxrZAlN+L0XwmYt5+0mHMEo6WDutzWS9FI+S+upqt1zDS6ik3BjuSPxbtespOEOYVHYuDBBnzX0VEt6LlN3EdfZwI2I6+v4TGMRBQtebFCPYnt2VmbNSetp67OGnpWsryo92wkL6PemvhiTx7jP4PHbSnfuEFqcank57QtjogEVqdNgzUno6cpnDT0rndNYz1LiKzGTThI28fN40W4mnfSNhBx2UAleLoN3m2XDNWvqqemzy6R/RRvGlWW16JznhHcLYRrJNRoz7hSfXxuc/kMDmPD6R5goM64SXoEQ70xENQod8nalp2ufA2He9YQBwhpash7XvJsgyFexgrsvo1CuupDwJq+4bXi5ilwE11CQt01LIemzZPDmdyHBuxBzQNtHCckKm8R38y7hh+HB0YaXy3JcyW6mqaemz9LhnHcGh5yoXfcQSci7xFUVZc/UJD6M/EVZM6kGtrySeAKhqae2z5LRR3iw4c1lYhbJxf84xG/uHgnzJePacJAonoTfNv4RMunI8HGYK17aSa+tp7bPruIg+HhqVwdMIuFnbHiPIMEKwDkGlz6C4z/+M+L7eyCi2SYkyctF0ifBu1Z9LhezqEZvhCdU/8FvwNuHj9qId3l+H8zozvvkAAABB3RFWHRNYXRoTUwAPG1hdGggeG1sbnM9Imh0dHA6Ly93d3cudzMub3JnLzE5OTgvTWF0aC9NYXRoTUwiPjxtbj4zPC9tbj48bWk+eDwvbWk+PG1vPis8L21vPjxtbj4yPC9tbj48bXN1cD48bWk+eDwvbWk+PG1uPjI8L21uPjwvbXN1cD48bW8+JiN4MjIxMjs8L21vPjxtbj40PC9tbj48bWk+eDwvbWk+PG1vPis8L21vPjxtbj4zPC9tbj48bXN1cD48bWk+eDwvbWk+PG1uPjI8L21uPjwvbXN1cD48bW8+JiN4MjIxMjs8L21vPjxtbj41PC9tbj48bWk+eDwvbWk+PC9tYXRoPnXeSY8AAAAASUVORK5CYII=)
The correct answer is: • A polynomial is in standard form when all its terms are arranged by decreasing order of degree.
- We have been given a function in the question.
- We will have to simplify it and further write the answer in its standard form.
Step 1 of 1:
We know that in polynomial we add/subtract like terms
So,
![3 x plus 2 x squared minus 4 x plus 3 x squared minus 5 x](data:image/png;base64,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)
![5 x squared minus 6 x](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAEMAAAARCAYAAACGjBGPAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAQ3ZOC+gAAAZVJREFUeNpjYKAd+A/Fv4D4KBCrMIwCBiYgzgLic6NBgQA/RoMAAuyB+OBQcex/PJhSIAktM5Ro6H5TIF4FxJ+gKXATNALIDgxaADUg3gINEFqBNKjn1aB8PiCOBuLDgykwQAGwDeo4WgEtID5Di2xCLEgG4g4s4s1QORgABYQGjbP3TCCOpLK7SU4ZoGpSHImfCMRTiCiHqA1ukJgFiXE3vHH0CRqjRUDMg8dQDyDug7JdgHjvAFbXoLJiHRB/g/rhDLTMoNjdLEBsDMS10FDHl8x3Q0vsC0AsTMPaDF+q+g+NbS+o20ENPGsgvgVt6FHN3W4E2gYF0JjQG8AmASglS2MRNwDip9R2N65WIyj010CTXOQABsY2aGrABn5R0906QHwXi7gStF7ngpYrZ6iQTcgFoKwQjkUclL1PkutuUAFkCQ1lJmhBAwqIIDR1otDYQDbEB4gXD1BgsEGzcjK0zAABcyC+BC0gyXJ3KLTQ+QPE76BNW1MsFq/DkUeXQwNwIADIo7OB+AvU/aDAsR0C7h7cAADS8XAru3J/LgAAAI90RVh0TWF0aE1MADxtYXRoIHhtbG5zPSJodHRwOi8vd3d3LnczLm9yZy8xOTk4L01hdGgvTWF0aE1MIj48bW4+NTwvbW4+PG1zdXA+PG1pPng8L21pPjxtbj4yPC9tbj48L21zdXA+PG1vPiYjeDIyMTI7PC9tbz48bW4+NjwvbW4+PG1pPng8L21pPjwvbWF0aD6d1bhtAAAAAElFTkSuQmCC)
Now, We know that the terms are written in descending order of their degree.
So, In the standard form
The given polynomial will be
.
Now, We know that the terms are written in descending order of their degree.
So, In the standard form
The given polynomial will be
Related Questions to study
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?
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.
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.
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.
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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)
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,iVBORw0KGgoAAAANSUhEUgAAAMwAAAAQCAYAAABa3pCmAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAOJ5y/mQAAA2lJREFUeNrtWkFkXEEYflasqCgVKyqHpSKqhwhVVSuqREXkkEvV6qmWqIrqvfZQvaweeqheoqeKKhVVK6KsqloVS0T1UNV7Dqu3ilgrvP6/fOHlmXlv3r7535va/fjIzr7N/PPN/DP//8/zvLN4SGx4bqIB+yTh8vhd02roMUfcddzGb7BzWMfvilYjQOD5nPr2Y3iKq8R2RuOvELeIf4l94nfiPYfm6xrxPezrEZvEmxlpZRsroXnOG7PEOuZciXksGNdwh/g61NbGYrAJ1fi/EqvECXy+gmeqDuiyBgeZxefzcOZ2BlrZBuv70zGH2YTGWpueE9eFTo5BMYUJHw+1P0qQZ5j2bzr+MvFHzpPJjrtn+GwSrfLCBrEm7DC+7d99Ii4o2gvEp8RuICwpZ+QwTU2IeIP42XL/uvGr0FO01TQL8xm+s73ATE+5JFrlgUrAPt1c2dDWusNwHFxUtG8TXxIvwHk4Zl7NwGEeIIZUoQh7bfavG79qAepC132ciqe4T3wlsMh+ES8aPhulle+Z544SKOK0LhvMVVptrTvMsaKtCgcJ4g1xWdhQFrBDHIt4pm+5/2ODZ8ZhV0Xz/RLxBf5eFNzZe8hdPhCPoMVeREGi77mJRigMjpqrtNpm4jBfsKOGE+FyTAdpdy3u41bMM33L/cc5DJ+wH4m3Y55reSeVKg5dJw0mYxBbfey4y9hUCnDi35767kXSYQYdw5zipPYd0DZVSHaEyQjmM4fCns1VsZ0UYYZESHYJzjJj8H8eY4FK3n+wrdOKds73Dv6TkKyj0NMX1Nb6CdNShBp/FAnavqChBcTncXdBEkl/SxNqXfZOytrnDBPYLYQOkqXnndBGFnWauJr0J3XUtNpadxhVWfXAO1vSrcNoKUNXEY7FYR322uxfNf4p5HBjBr/nU6gJx5pATjEptNg47Lqrce5OCq1ccCIpba07jOrijst2G9jNOG95axAupTH0HaofcUhyGWfav2r821iEcShBl+Ak8s31pmB1iTeWWsCZr6PitJhCKxcdxpa21h2GsauID59gl63jtOl6ycrKSdBFch0Fydc9wuM3CRmKqFZNazaAJSFbSwgVD1GwYAdayFCrLBwmL20903zO5OXDUs6ijl6+dEOrEQC+MHT1VQqOxdeGePyuaTWU+Afnazoj+79b6AAAAQF0RVh0TWF0aE1MADxtYXRoIHhtbG5zPSJodHRwOi8vd3d3LnczLm9yZy8xOTk4L01hdGgvTWF0aE1MIj48bW8+KDwvbW8+PG1pPmE8L21pPjxtbz4rPC9tbz48bW4+NzwvbW4+PG1vPik8L21vPjxtbz4rPC9tbz48bW8+KDwvbW8+PG1uPjI8L21uPjxtaT54PC9taT48bW8+JiN4MjIxMjs8L21vPjxtbj42PC9tbj48bW8+KTwvbW8+PG1vPj08L21vPjxtbz4mI3gyMjEyOzwvbW8+PG1uPjQ8L21uPjxtaT54PC9taT48bW8+KzwvbW8+PG1uPjE8L21uPjwvbWF0aD5LgVtbAAAAAElFTkSuQmCC)
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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)
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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)
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)?
This question can be easily solved by using the formula
(a + b)(a - b) = a2 - b2
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
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
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
This question can be easily solved by using the formula
(a + b)2 = a2 + 2ab + b2