We appreciate your visit to Write an inequality to describe the constraints A tex 1000b 2500p textgreater 60000 tex B tex 1000b 2500p textgreater 60000 tex C tex 1000b 2500p. This page offers clear insights and highlights the essential aspects of the topic. Our goal is to provide a helpful and engaging learning experience. Explore the content and find the answers you need!
Answer :
To solve the problem of determining which inequality describes the constraints, let's look at each inequality option given in the solution:
1. 1000b - 2500p > 60000: This inequality involves subtracting a term with [tex]\( p \)[/tex] from a term with [tex]\( b \)[/tex], and it suggests that [tex]\( 1000b \)[/tex] must be significantly larger than [tex]\( 2500p \)[/tex] for the result to exceed 60000.
2. 1000b + 2500p > 60000: Here, the addition of [tex]\( 1000b \)[/tex] and [tex]\( 2500p \)[/tex] must together exceed 60000. This could imply a scenario where both [tex]\( b \)[/tex] and [tex]\( p \)[/tex] contribute positively to reaching a value over 60000.
3. 1000b + 2500p \geq 60000: Similar to the second inequality, but with a condition that allows the sum to be equal to 60000, not just greater.
4. 25006 + 1000p \geq 60000: This inequality brings in a specific constant value 25006 added to [tex]\( 1000p \)[/tex], which should reach or exceed 60000. This suggests that the term with [tex]\( p \)[/tex] plays a solo role in balancing out the constant to meet the inequality.
For the constraints described, evaluate what scenario each inequality could represent and how they might compare or relate to real-world applications, such as financial thresholds or resource allocations that need to exceed a certain amount.
Each inequality presents a different combination of the variables and their coefficients or constants, focused on surpassing a given value of 60000, whether strictly greater (>) or allowing equality (≥).
Understanding these distinctions helps justify which inequality best describes the desired conditions you are considering or emphasizing particularly in given scenarios, but all four are valid representations as chosen initially.
1. 1000b - 2500p > 60000: This inequality involves subtracting a term with [tex]\( p \)[/tex] from a term with [tex]\( b \)[/tex], and it suggests that [tex]\( 1000b \)[/tex] must be significantly larger than [tex]\( 2500p \)[/tex] for the result to exceed 60000.
2. 1000b + 2500p > 60000: Here, the addition of [tex]\( 1000b \)[/tex] and [tex]\( 2500p \)[/tex] must together exceed 60000. This could imply a scenario where both [tex]\( b \)[/tex] and [tex]\( p \)[/tex] contribute positively to reaching a value over 60000.
3. 1000b + 2500p \geq 60000: Similar to the second inequality, but with a condition that allows the sum to be equal to 60000, not just greater.
4. 25006 + 1000p \geq 60000: This inequality brings in a specific constant value 25006 added to [tex]\( 1000p \)[/tex], which should reach or exceed 60000. This suggests that the term with [tex]\( p \)[/tex] plays a solo role in balancing out the constant to meet the inequality.
For the constraints described, evaluate what scenario each inequality could represent and how they might compare or relate to real-world applications, such as financial thresholds or resource allocations that need to exceed a certain amount.
Each inequality presents a different combination of the variables and their coefficients or constants, focused on surpassing a given value of 60000, whether strictly greater (>) or allowing equality (≥).
Understanding these distinctions helps justify which inequality best describes the desired conditions you are considering or emphasizing particularly in given scenarios, but all four are valid representations as chosen initially.
Thanks for taking the time to read Write an inequality to describe the constraints A tex 1000b 2500p textgreater 60000 tex B tex 1000b 2500p textgreater 60000 tex C tex 1000b 2500p. We hope the insights shared have been valuable and enhanced your understanding of the topic. Don�t hesitate to browse our website for more informative and engaging content!
- Why do Businesses Exist Why does Starbucks Exist What Service does Starbucks Provide Really what is their product.
- The pattern of numbers below is an arithmetic sequence tex 14 24 34 44 54 ldots tex Which statement describes the recursive function used to..
- Morgan felt the need to streamline Edison Electric What changes did Morgan make.
Rewritten by : Barada
